In response to the stated question, we may respond that As a result, the expressions laboratory should be closed for 5.19 days to allow the radon gas to decline to a safe level.
what is expression ?An expression in mathematics is a combination of numbers, elements, and mathematical (like addition, reduction, multiplication, division, algebraic, and so on) that expresses an amount or value. Expressions may well be simple, such as [tex]"3 + 4"[/tex], or complicated, such as [tex]"(3x2 - 2) / (x + 1)"[/tex]. They might additionally contain functions like "sin(x)" or "log(y)". Expressions can be assessed by substituting variables with their values and performing the arithmetic operations in the specified sequence. For example, if x = 2, the ratio [tex]"3x + 5" equals 3(2) + 5 = 11.[/tex]Expressions are commonly used in mathematics to describe real-world situations, generate equations, and simplify complicated mathematical concerns.
We must apply the notion of radioactive decay and the half-life of radon gas to address this dilemma.
Begin by calculating the percentage of the safe radiation level that corresponds to the 40% increase. This can be written as:
[tex]1 + 0.4 = 1.4[/tex]
As a result, the resultant radiation level is 1.4 times that of the safe threshold.
To compute the proportion of the original amount of radon gas that remains after a certain period t, we may use the following formula:
[tex]N/NO = (1/2) t/T1/2)1/2 t/3.8) = 1/1.42 t/3.8) 1.4t / 3.8 = log(2) * (1.4)(1.4)t = 3.8x * log(2) * (1.4)t = 5.19[/tex]
As a result, the laboratory should be closed for 5.19 days to allow the radon gas to decline to a safe level.
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Perceptions of same-sex marriage: In June 2016, a CBS News poll asked a sample of adults worldwide whether it should be legal or not legal for same-sex couples to marry (reported at http://www.pollingreport.com). The opinions of adults worldwide were as follows: 58%, legal; 33%, not legal; and 9%, unsure/no answer.
What type of distribution is this? __________________________
Knowing that 1,280 adults were polled nationwide, how many Americans polled felt that same-sex couples should be allowed to legally marry? __________________________
Answer:
Perceptions of same-sex marriage: In June 2016, a CBS News poll asked a sample of adults worldwide whether it should be legal or not legal for same-sex couples to marry (reported at http://www.pollingreport.com). The opinions of adults worldwide were as follows: 58%, legal; 33%, not legal; and 9%, unsure/no answer.
What type of distribution is this? __________________________
Knowing that 1,280 adults were polled nationwide, how many Americans polled felt that same-sex couples should be allowed to legally marry? __________________________
Step-by-step explanation:
The distribution of opinions on the legality of same-sex marriage worldwide is not described in the prompt, so it is not possible to determine the type of distribution. However, it is possible to use the proportions provided to estimate the number of Americans who felt that same-sex couples should be allowed to legally marry.
If 58% of all adults worldwide believe that same-sex marriage should be legal, and 1,280 adults were polled nationwide, we can estimate the number of Americans who hold this opinion as:
0.58 x 1,280 = 742.4
Therefore, an estimated 742 Americans polled felt that same-sex couples should be allowed to legally marry.
find the volume of a frustum of a pyramid with square base of side 27, square top of side 15 and height 10.
The volume of the frustum of the pyramid is 4530 cubic units.
To find the volume of a frustum of a pyramid, we can use the formula
V = (1/3)h(A1 + A2 + sqrt(A1A2))
Where
V is the volume of the frustum.
h is the height of the frustum.
A1 is the area of the base of the frustum.
A2 is the area of the top of the frustum.
In this case, the frustum has a square base of side 27 and a square top of side 15. Therefore, we have
A1 = 27^2 = 729
A2 = 15^2 = 225
h = 10
Now we can plug these values into the formula
V = (1/3)10(729 + 225 + sqrt(729*225))
V = (1/3)10(954 + sqrt(164025))
V = (1/3)10(954 + 405)
V = (1/3)10(1359)
V = 4530 cubic units
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spinner is divided into seven equal sections numbered 1 through 7 If the spinner is spun twice, what is the theoretical probability that it lands on 2 and then an odd number?
A) 1/49
B) 4/49
C) 1/7
D) 4/7
Answer:
B is correct
Step-by-step explanation:
If it is spun twice then the probability of it landing on 2 and then an odd number is:
Pr(2,1) or Pr(2,3) or Pr(2,5) or Pr(2,7)
1/49 * 4
4/49
What is the meaning of "Euclidean geometry"?
The concept of Euclidean geometry is the study of geometrical shapes (plane and solid) and figures based on different theorems and axioms.
What is the concept of Euclidean geometry?The concept of Euclidean geometry as required to be discussed is basically introduced for flat surfaces or plane surfaces. The postulates of the Euclidean geometry are as follows!
1 : A straight line may be drawn from any one point to any other point.
2 :A terminated line can be produced indefinitely.
3 : A circle can be drawn with any centre and any radius.
4 : All right angles are equal to one another (Congruent).
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I give brainliest for the answer
The intersection of two parallel lines; x = 10 metres.
Describe another angle using an example.Alternate angles are created when two parallel lines are intersected by a transversal. Have a look at the given illustration; the two parallel lines are EF and GH. When a transversal splits two parallel lines, the alternate angles are equal.
The alternate interior angles are equal because of the parallel lines characteristic.
Angle STQ (denoted as 2x+10) and angle RQS are hence equal. Angle QRP (shown as x+20) and angle RQS are likewise equal.
Setting these two angles equal to each other, we can get:
x+20 = 2x+10
Simplifying this equation, we get:
x = 10.
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pls answer this <33
<333
Answers:
a) geometric
b) arithmetic
c) arithmetic
d) geometric
Explanations:
An arithmetic sequence is a when the next term is achieved by adding/subtracting by a constant (the same number) to the current term.
A geometric sequence is a when the next term is achieved by multiplying/diving the current term by a constant. (i.e. the ratio between any two consecutive terms is the same for any other two consecutive terms).
a) The numbers are all products of the previous term by a multiple of 2 (i.e. each term is multiplied by 2 to get the next term).
b) The numbers increase by the same amount between every term (by 3 in this case).
c) The numbers increase by the same amount between every term (by 5 in this case).
d) The numbers are all products of the previous term by a multiple of 10 (i.e. each term is multiplied by 10 to get the next term).
if the graph of f (x) = 3^x is reflected over the x-axis, what is the equation of the new graph
Answer:
If the graph of f (x) = 3 is reflected over the x-axis, the equation of the new graph is g(x) = -3, so the correct answer is D. g(x) = -().
In a recent survey a random sample of 320 married couples were asked about their education levels 41 couples reported that at least one of the parents had a doctorate degree use your calculator to find value of Z that should be used to calculate confidence in a role for the percentage of married couples in which at least one partner has a doctorate with a 95% confidence level round three decimal places
Answer:
Step-by-step explanation:
To find the value of Z for a 95% confidence level, we can use a standard normal distribution table or a calculator that has a built-in function for finding Z values.
Using a calculator, we can use the following steps:
Determine the level of confidence, which is 95%. This means that the probability of the true population proportion being within the confidence interval is 0.95.
Find the critical value of Z using a Z-table or calculator. For a 95% confidence level, the critical Z value is 1.96.
Calculate the sample proportion, which is the number of married couples in the sample with at least one partner having a doctorate degree divided by the total sample size:
p-hat = 41/320 = 0.128125
Calculate the standard error of the sample proportion, which is the square root of the product of the sample proportion and the complement of the sample proportion, divided by the sample size:
SE(p-hat) = sqrt((p-hat)(1 - p-hat)/n) = sqrt((0.128125)(1 - 0.128125)/320) = 0.0248 (rounded to four decimal places)
Calculate the margin of error, which is the product of the critical Z value and the standard error:
Margin of error = Z * SE(p-hat) = 1.96 * 0.0248 = 0.0486 (rounded to four decimal places)
Calculate the lower and upper bounds of the confidence interval by subtracting and adding the margin of error to the sample proportion:
Lower bound = p-hat - margin of error = 0.128125 - 0.0486 = 0.0795 (rounded to four decimal places)
Upper bound = p-hat + margin of error = 0.128125 + 0.0486 = 0.1767 (rounded to four decimal places)
Therefore, the 95% confidence interval for the percentage of married couples in which at least one partner has a doctorate degree is (0.0795, 0.1767).
can anyone help with this triangle question
Step-by-step explanation:
Set it up as a ratio:
14 is to (14 +6) as 21 is to ?
14/20 = 21/?
? = 21 * 20 / 14 = 30 units
Find the definite integral of f(x)=
fraction numerator 1 over denominator x squared plus 10x plus 25 end fraction for x∈[5,7]
the definite integral of f(x) over the interval [5, 7] is (-5 / 600).
How to find?
The given function is:
f(x) = 1 / (x² + 10x + 25)
To find the definite integral of this function over the interval [5, 7], we can use the following steps:
Rewrite the function using partial fraction decomposition:
f(x) = 1 / (x² + 10x + 25)
= 1 / [(x + 5)²]
Using partial fraction decomposition, we can write this as:
f(x) = A / (x + 5) + B / (x + 5)²
where A and B are constants to be determined. Multiplying both sides by the common denominator (x + 5)², we get:
1 = A(x + 5) + B
Setting x = -5, we get:
1 = B
Setting x = 0, we get:
1 = 5A + B
= 5A + 1
Solving for A, we get:
A = 0
Therefore, the partial fraction decomposition is:
f(x) = 1 / [(x + 5)²]
= 0 / (x + 5) + 1 / (x + 5)²
Use the formula for the definite integral of a power function:
∫ xⁿ dx = (1 / (n + 1))× x²(n + 1) + C
where C is the constant of integration.
Using this formula, we can find the antiderivative of the function 1 / (x + 5)²:
∫ 1 / (x + 5)² dx = -1 / (x + 5) + C
Evaluate the definite integral over the interval [5, 7]:
∫[5,7] 1 / (x + 5)² dx
= [-1 / (x + 5)] [from 5 to 7]
= (-1 / 12) - (-1 / 10)
= (-5 / 600)
Therefore, the definite integral of f(x) over the interval [5, 7] is (-5 / 600).
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TRUE/FALSE. Every random sample of the same size from a given population will produce exactly the same confidence interval for μ.
FALSE. Every random sample of the same size from a given population will not produce exactly the same confidence interval for μ.
The confidence interval is a statistical measure used to estimate the range of values within which a population parameter is likely to fall. The confidence interval is calculated based on the sample mean and standard deviation, as well as the level of confidence desired.
Suppose we take a random sample of size n from a population, and calculate the confidence interval for the population mean using this sample. The sample mean and the sample standard deviation will be used to estimate the true population mean and the population standard deviation, respectively. However, as the sample is random, each sample—despite being drawn from the same population—will have different values for the sample mean and standard deviation. Thus, different samples will produce different confidence intervals for the population mean.
Moreover, the size of the sample also affects the width of the confidence interval; larger samples tend to produce more precise estimates of the population mean, while smaller samples yield larger confidence intervals. Therefore, random samples of different sizes from a given population will also produce different confidence intervals.
In summary, the confidence interval is a statistical measure that provides a range of likely values for the population parameter, such as the population mean. While it can be calculated using any random sample from a population, different samples of the same size or different sizes will generally produce different confidence intervals.
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Anne, Boris, and Carl ran a race. They started at the same time, and their speeds were constant. When Anne finished, Boris had 15 m to run, and Carl had 35 m to run. When Boris finished, Carl had 22 m to run. What is the distance they ran?
The distance they ran is [tex]b * t1^2 * (d - 35) + 15 * t1 = 13t1.[/tex]
In math, what is a distance?The length οf the line segment cοnnecting the twο sites is used tο measure distance between them. The shοrtest line segment between a pοint and a line will have a length equal tο the distance between them.
With the data abοve, we can create twο equatiοns using the fοrmula distance = speed x time:
Equatiοn 1: (d - 15) = b * t1
Equatiοn 2: (d - 35) = c * t1
Where t1 is the amοunt οf time it tοοk Anne tο cοmplete the race.
Carl cοvered a distance οf d - 22 after Bοris had dοne his 22 m οf running. The same fοrmula can be used tο create a different equatiοn:
Equatiοn 3: (d - 22) = c * t2
where t2 is the amοunt οf time it tοοk Bοris tο cοmplete the race.
Equatiοns 1 and 2 can be used tο find b and c in terms οf t1:
b = (d - 15) / t1
c = (d - 35) / t1
Substituting these equatiοns intο Equatiοn 3, we get:
(d - 22) = (d - 35) / t1 * t2
Simplifying, we get:
t1 * t2 = 13 / c
In the previοus equatiοn, we may substitute the fοrmulas fοr b and c in terms οf t1 tο οbtain:
t1 * t2 = 13t1 / (d - 35)
Simplifying, we get:
t2 = 13 / (d - 35)
Tο sοlve fοr b in terms οf t1, we can insert the fοllοwing fοrmula fοr t2 intο Equatiοn 1:
(d - 15) = b * t1
(d - 15) = ((d - 35) / t1) * 13 / (d - 35) * t1
Simplifying, we get:
b = 13 / t1 - 2
Substituting this expressiοn fοr b intο Equatiοn 2, we get:
(d - 35) = c * t1
(d - 35) = ((d - 15) / t1 - 13 / t1 + 2) * t1
Simplifying, we get:
c = (d - 35) / t1 + 13 / t1 - 2
Nοw we can create anοther equatiοn using these expressiοns fοr b and c in terms οf t1:
d = (d - 15) + 15 = b * t1 + 15
d = (d - 22) + 22 = c * t2 + 22 = (d - 35) / t1 * 13 / (d - 35) + 22
When we equalize these twο expressiοns, we οbtain:
b * t1 + 15 = (d - 35) / t1 * 13 / (d - 35) + 22
Multiplying bοth sides by t1 * (d - 35), we get:
b * t1² * (d - 35) + 15 * t1 * (d - 35) = 13t1² + 22t1 * (d - 35)
Simplifying, we get:
b * t1² * (d - 35) + 15 * t1 = 13t1
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10. You buy a 1-pound box of oatmeal. You use of the box, then divide the
remainder into 4 equal portions. How many pounds are in each portion?
Therefore, each portion will be (1-x)/4 pounds.
What are pounds?Pounds (lb) is a unit of measurement of weight or mass commonly used in the United States, United Kingdom, and other countries that have adopted the Imperial system of measurement. One pound is equal to 0.453592 kilograms (kg). The symbol for pound is "lb", which comes from the Latin word libra. In everyday use, pounds are often used to measure the weight of objects, people, and animals, as well as food and other goods sold by weight.
Given by the question.
If you have used x pounds of the 1-pound box of oatmeal, then the remaining amount is 1 - x pounds.
You then divide this remainder into 4 equal portions, which means each portion will be (1-x)/4 pounds.
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A pension fund manager decides to invest a total of at most $40 million in U.S. Treasury bonds paying 6% annual interest and in mutual funds paying 8% annual interest. He plans to invest at least 5$ million in bonds and at least 15$ million in mutual funds. Bonds have an initial fee of $100 per million dollars, while the fee for mutual funds is $200 per million. The fund manager is allowed to spend no more than $7000 on fees. How much should be invested in each to maximize annual interest? What is the maximum annual interest?
The amount that should be invested in Treasury bonds is $___ million and the amount that should be invested in mutual funds is $__ million.
The maximum annual interest is $___
Answer:
Let x be the amount invested in Treasury bonds and y be the amount invested in mutual funds. Then we have the following constraints:
x + y ≤ 40 (total investment cannot exceed $40 million) x ≥ 5 (at least $5 million must be invested in Treasury bonds) y ≥ 15 (at least $15 million must be invested in mutual funds) 100x + 200y ≤ 7000 (total fees cannot exceed $7000)
The objective is to maximize the annual interest, which is given by:
0.06x + 0.08y
We can solve this problem using linear programming. The feasible region is a polygon with vertices at (5, 15), (5, 35), (30, 10), and (40, 0). We evaluate the objective function at each vertex:
At (5, 15): 0.06(5) + 0.08(15) = 1.2At (5, 35): 0.06(5) + 0.08(35) = 2.6At (30, 10): 0.06(30) + 0.08(10) = 2.8At (40, 0): 0.06(40) + 0.08(0) = 2.4
The maximum value of the objective function is 2.8, which occurs at (30, 10). Therefore, the amount that should be invested in Treasury bonds is $30 million and the amount that should be invested in mutual funds is $10 million.
The annual interest earned is 0.06(30) + 0.08(10) = $2.8 million.
Step-by-step explanation:
show the value of the following decimal floating-point number as a single precision floating point values following the ieee std 754-1985111.125
The value of the following decimal floating-point number as a single precision floating point values following the ire std 754-1985111.125 is
1100 0001 0110 0100 0000 0000 0000 0000
= C1640000H
IEEE-754 representation for float (single-precision) type is as follows
Sign - 0
Exponent - 1 to 18
Mantissa - 9 to 31
So the exponent field is 8 bits and the mantissa is 23 bits (the precision is actually 24 bits due to the implicit 1 needed in the normalized representation; IEEE 754 also allows demoralized numbers close to 0, but this does not does not apply to the particular question).
Exponential fields also require signs to represent fractions. IEEE 754 does this by giving a bias - 127 for single precision, which means we just subtract 127 from the suggested value to get the actual value. So 0 becomes -127 and 255 (the maximum 8-bit value becomes 128.
Now, coming to the given question we need to represent -14.25 which equals -1110.01 in binary.
Converting to normalized form (only one to the left ) we get
-11101.01 =-1.11001 × 2³
Since we omit the implied in IEEE-754 representation we get
Mantissa bits = 11001
Exponent bits = 11 + 0111111 = 10000010 (Adding bias Sign bit 1)
(since number is negative)
This will be 1 × 110000010 = 11001000000000
Grouping in 4 bits to convert ot Hexadecimal we get
1100 0001 0110 0100 0000 0000 0000 0000
= C1640000H
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Write the function in factored form. Check by multiplication.
y = - 4x³ - 16x² +84x
y= (Factor completely.)
Answer:
Step-by-step explanation:
We can factor out a common factor of -4x from the equation:
y = -4x(x² + 4x - 21)
To factor the quadratic expression in the parentheses, we need to find two numbers that multiply to -21 and add to 4. These numbers are 7 and -3:
y = -4x(x + 7)(x - 3)
To check our work, we can multiply the three factors:
y = -4x(x + 7)(x - 3) = -4x(x² + 4x - 21) = -4x³ - 16x² + 84x
So the factored form is y = -4x(x + 7)(x - 3), and the check shows that we have factored the equation correctly.
The original price of each 6‑day ski pass is reduced by 15% in a sale. In the sale the price of each 6‑day ski pass is $272.
(a) Calculate the original price of each 6‑day ski pass. The price of each 3‑day ski pass is £110 The exchange rate is £1 = $1.70 .
(b) Calculate how much Andrew will save by buying one 6‑day ski pass in the sale rather than two 3‑day ski passes.
Step-by-step explanation:
(a) Let the original price of each 6-day ski pass be x. Then, the sale price of each pass is 0.85x = 272. Solving for x, we have:
0.85x = 272
x = 320
Therefore, the original price of each 6-day ski pass was $320.
(b) Two 3-day ski passes cost 2 x £110 = £220. Converting to US dollars using the exchange rate, we have:
£220 x 1.70 = $374
Therefore, Andrew would save:
$374 - $272 = $102
by buying one 6-day ski pass in the sale rather than two 3-day ski passes.
6TH GRADE MATH IS THIS CORRECT??
Answer:
Step-by-step explanation:
y2-y1/x2-x1
-7-(-19)/-2-1
12/-2
-6
The slope is -6
Match each discrete variable with the appropriate continuity correction to use with the normal distribution Drag and drop options on the right hand side and submit. For keyboard navigation... SHOW MORE III x 25 x 24.5 X 225 x> 25.5 III x<25 x 25.5 III X<24.5 XS25
The discrete variable with the appropriate continuity correction is:
x > 25 should use the continuity correction of x > 25.5
x ≥ 25 should use the continuity correction of x ≥ 25.5
x < 25 should use the continuity correction of x < 24.5
x ≤ 25 should use the continuity correction of x ≤ 24.5
For the normal distribution approximation of a discrete variable, we use continuity correction. The continuity correction adjusts the boundaries of the discrete variable to match the boundaries of the continuous distribution.
x > 25 should use the continuity correction of x > 25.5
x ≥ 25 should use the continuity correction of x ≥ 25.5
x < 25 should use the continuity correction of x < 24.5
x ≤ 25 should use the continuity correction of x ≤ 24.5
The continuity correction adds or subtracts 0.5 from the boundary value, depending on whether the boundary is inclusive or exclusive.
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The given question is incomplete, the complete question is:
Match each discrete variable with the appropriate continuity correction to use with the normal distributio. x>25 x≥25 x<25 x≤25 x≥24.5 x>25.5 x≤25.5 x<24.5
PLEASE HELP (Will give brainliest to the first person to answer and the grid goes up by 250s and across by 0.5s)
The following graph represents the distance a commercial airplane travels over time, at cruising speed and an altitude of 35,000 feet. In fact, the distance the airplane travels at cruising speed is directly proportional to the time it travels. What is the cruising speed of the airplane? In your answer, use complete sentences to describe how you found the speed.
1,567 - 2,1134 - 3,1701 - 4, 2268 - 5,2268
By analyzing the relationship between the distance traveled and the time taken from the given graph, we determined that the cruising speed of the airplane is 567 units of distance per 1 unit of time.
To find the cruising speed of the airplane, we can analyze the given graph and observe the relationship between the distance traveled and the time taken.
Looking at the data points provided, we see that the distance traveled is directly proportional to the time taken. This means that for every unit increase in time, there is a corresponding increase in the distance traveled.
Let's consider the first two data points: (1,567) and (2,1134). The time difference between these two points is 2 - 1 = 1, and the distance traveled difference is 1134 - 567 = 567.
Since the distance traveled is directly proportional to time, we can conclude that the speed of the airplane is equal to the distance traveled divided by the time taken. In this case, the speed would be 567 units of distance per 1 unit of time.
Now, let's calculate the cruising speed using the other data points as well:
(2,1134) - (1,567) = 1134 - 567 = 567 units of distance per 1 unit of time
(3,1701) - (2,1134) = 1701 - 1134 = 567 units of distance per 1 unit of time
(4,2268) - (3,1701) = 2268 - 1701 = 567 units of distance per 1 unit of time
(5,2268) - (4,2268) = 2268 - 2268 = 0 units of distance per 1 unit of time
We can see that for each time interval, the distance traveled is always 567 units. Therefore, we can conclude that the cruising speed of the airplane is 567 units of distance per 1 unit of time.
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Mortgage
Status Current Past
Due In
Foreclosure Repossessed Total
Number 156,330 58,310 8,550 5,590 228,780
(The four categories are mutually exclusive; for instance, "Past Due" refers to a mortgage whose payment status is past due but is not in foreclosure, and "In Foreclosure" refers to a mortgage that is in the process of being foreclosed but not yet repossessed.)
(a)
Find the probability that a randomly selected subprime mortgage in the state during November 2008 was neither in foreclosure nor repossessed. HINT [See Example 1.] (Round your answer to two decimal places.)
(b)
What is the probability that a randomly selected subprime mortgage in the state during November 2008 was not current? (Round your answer to two decimal places.)
a) The probability that a randomly selected subprime mortgage in the state during November 2008 was neither in foreclosure nor repossessed is 0.50.
b) The probability that a randomly selected subprime mortgage in the state during November 2008 was not current is 0.32.
What is the probability?Probability describes the chance or likelihood that an expected outcome or event does or does not occur.
Probability is the quotient of the expected outcome over the total number of possible outcomes or events.
Probabilities can be stated in ratios (fractions, decimals, or percentages).
Mortgage Status
Current Past Due In Foreclosure Repossessed Total
Number 156,330 58,310 8,550 5,590 228,780
The number of subprime mortgage neither in foreclosure nor repossessed = 114,640 (156,330 + 58,310)
The probability that a subprime mortgage in the state was neither in foreclosure nor repossessed = 0.50 (114,640/228,780).
The number of subprime mortgage that was not current = 72,450 (58,310 + 8,550 + 5,590) or (228,780 - 156,330)
The probability that a subprime mortgage in the state was not current = 0.32 (72,450/228,780).
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Which function represents the following graph?
Oy=√√x-3+3
Oy=√√x+3+3
O y=3√√x-3+3
Oy-3√x+3+3
The correct option b) [tex]\rm y = \sqrt{x+ 3} + 3[/tex] is a function of the given graph.
What particular graph best illustrates a function?The graph οf a relatiοn is said tο reflect a functiοn if a vertical line drawn anywhere οn the graph οnly intersects the graph οnce. In the event when a vertical line can graph is nοt a representatiοn οf a functiοn if there are mοre than twο pοints οn it.
The graphs coordinate is at (-3, 3)
Lets put the value in all the given function to find the correct function
a. [tex]\rm y = \sqrt{x - 3} + 3[/tex]
Using (-3, 3) as x and y
[tex]\rm 3 = \sqrt{(-3) - 3} + 3[/tex]
[tex]\rm 3 = \sqrt{9} + 3[/tex]
[tex]\rm 3 \neq 3 + 3[/tex]
[tex]\rm y = \sqrt{x - 3} + 3[/tex] is not a function of graph.
b. [tex]\rm y = \sqrt{x+ 3} + 3[/tex]
Using (-3, 3) as x and y
[tex]\rm 3 = \sqrt{-3+ 3} + 3[/tex]
[tex]\rm 3 = \sqrt{0} + 3[/tex]
[tex]\rm 3 = 0 + 3[/tex]
[tex]\rm 3 = 3[/tex]
[tex]\rm y = \sqrt{x+ 3} + 3[/tex] is a function of the given graph.
The other two options are no the functions as cube root is used and the value of x wont satisfy there.
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I need your help to buy a door for my house. I have a scale drawing for the door I want but I am not sure of the true size. In the scale drawing the length is 4 in and the width as 7in. The scale for the door is 1 in = 1.5 ft. What are the actual measurements of the door?
Answer:
According to the scale, 1 inch on the drawing represents 1.5 feet in real life. So, to find the actual length of the door, we need to multiply the length on the drawing by the scale factor:
4 inches x 1.5 feet/inch = 6 feet
Similarly, to find the actual width of the door, we need to multiply the width on the drawing by the scale factor:
7 inches x 1.5 feet/inch = 10.5 feet
Therefore, the actual measurements of the door are 6 feet by 10.5 feet.
Тема: ПИРАМИДА, ОКОЛО ОСНОВАНИЯ КОТОРОЙ
ОПИСАНА ОКРУЖНОСТЬ
AD=BD=CD=13
DO перпендикулярно (ABC)
Угол ABC=30
Найти AC
Answer:
Step-by-step explanation:
Для решения задачи мы можем использовать свойства треугольников и окружностей.
Первое, что мы можем заметить, это что треугольник ABD является равносторонним, так как все его стороны имеют одинаковую длину 13. Это означает, что угол ABD также равен 60 градусам.
Также мы можем заметить, что точка O является центром окружности, вписанной в треугольник ABD, так как все ее стороны касаются окружности в точке D. Из свойств вписанных углов, мы знаем, что угол AOD равен половине угла ABD, то есть 30 градусам.
Далее, мы можем заметить, что треугольник AOC является равнобедренным, так как угол ACO равен углу OCA (они оба равны 75 - 30 = 45 градусов), а сторона AC имеет одинаковую длину с стороной AB.
Таким образом, мы можем найти длину стороны AC, используя теорему косинусов для треугольника AOC:
AC^2 = AO^2 + OC^2 - 2 * AO * OC * cos(45)
Заметим, что AO = DO, так как точка O является центром вписанной окружности, а DO является радиусом этой окружности. Из прямоугольного треугольника ADO мы можем выразить DO как DO = AD/2 = 6.5.
Также, мы можем выразить OC, используя равенство углов в треугольнике ACO (ACO и AOD являются вертикальными углами):
ACO = AOD = 30 градусов
Тогда, угол OCA равен 180 - 2 * 45 = 90 градусам, что означает, что треугольник OCA является прямоугольным, и мы можем использовать теорему Пифагора:
OC^2 + AC^2 = OA^2
OC^2 + AC^2 = DO^2
AC^2 = DO^2 - OC^2
Теперь мы можем подставить выражения для DO и OC, и получить:
AC^2 = 6.5^2 - (6.5/sqrt(2))^2
AC^2 = 42.25 - 22.5625
AC^2 = 19.6875
AC = sqrt(19.6875)
AC = 4.43 (с точностью до сотых)
Таким образом, длина стороны AC равна пр
What is the probability that a 58% free-throw shooter will miss her next free throw?
Cost, revenue, and profit are in dollars and x is the number of units.
Suppose that the total revenue function is given by
R(x) = 47x
and that the total cost function is given by C(x) = 100 + 30x + 0.1x2.
(a) Find P(100).
P(100) =
(b) Find the marginal profit function MP.
MP =
(c) Find MP at x = 100.
MP(100) =
Explain what it predicts.
At x = 100, MP(100) predicts that profit will increase by |MP(100)| dollars.
At x = 100, MP(100) predicts that cost will decrease by |MP(100)| dollars.
At x = 100, MP(100) predicts that profit will decrease by |MP(100)| dollars
. At x = 100, MP(100) predicts that cost will increase by |MP(100)| dollars.
(d) Find P(101) − P(100).
$
Explain what this value represents.
The sale of the 101st unit will increase profit by |P(101) − P(100)| dollars.
The sale of the 100th unit will increase profit by |P(101) − P(100)| dollars.
The sale of the 101st unit will decrease profit by |P(101) − P(100)| dollars.
The sale of the 100th unit will decrease profit by |P(101) − P(100)| dollars.
R(x) = 47x denotes the total revenue function, and C(x) = 100 + 30x + 0.1x2 is the total cost function.
(a) P(100) = -200
(b) MP(x) = 47 - (30 + 0.2x)
(c) MP(100) = -3
(d) P(101) - P(100) = -0.2
(a) P(100) represents the profit made when x=100 units are sold. It can be calculated as follows:
P(x) = R(x) - C(x)
P(100) = R(100) - C(100)
P(100) = [tex]47(100) - (100 + 30(100) + 0.1(100)^2)[/tex]
P(100) = 4700 - 4000 - 100
P(100) = -200
(b) The marginal profit function MP represents the rate of change of profit with respect to the number of units sold. It can be calculated as follows:
MP(x) = R'(x) - C'(x)
MP(x) = 47 - (30 + 0.2x)
(c) MP(100) represents the marginal profit at x=100 units. It can be calculated by substituting x=100 into the marginal profit function:
MP(100) = 47 - (30 + 0.2(100))
MP(100) = 47 - 50
MP(100) = -3
Profit will drop by |MP(100)| dollars at x = 100, according to MP(100).
(d) P(101) - P(100) represents the additional profit made when the 101st unit is sold compared to when the 100th unit is sold. It can be calculated as follows:
P(101) - P(100) = R(101) - C(101) - R(100) + C(100)
P(101) - P(100) =[tex]47(101) - (100 + 30(101) + 0.1(101)^2) - 47(100) + (100 + 30(100) + 0.1(100)^2)[/tex]
P(101) - P(100) = 47 - 30 - 0.2(101) - 47 + 30 + 0.1(100)
P(101) - P(100) = -0.2
The sale of the 101st unit will increase profit by $0.20.
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The sides of a triangle have lengths
7.5,11
, and
x
. If
x
is an integer, what is the least possible value of
x
? A. 1 B. 2 C. 3 D. 4 E. 5
If x is an integer, the least possible value of x is 4. So the option D is correct.
The triangle's third side should be less than the sum of the other two sides and more than the difference of the other two sides.
11 - 7.5 < x < 11 + 7.5
Simplify
3.5 < x < 18.5
So the value of the x is between 3.5 and 18.5.
From the option the value 4 and 5 lies between 3.5 and 18.5.
As we have to determine the least possible value of x, so the value of x should be 4. So the option D is correct.
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The complete question is:
The sides of a triangle have lengths 7.5, 11, and x. If x is an integer, what is the least possible value of x?
A. 1
B. 2
C. 3
D. 4
E. 5
PLease help me this is due in 10 more minutes
The slope of the equation [tex]y = -x + 3 is -1[/tex] , and its y-intercept is 3. In addition, the line [tex]y = -x + 3[/tex] has 3 as its x-intercept.
What is the intercept of the line?Determine the slope of the line by determining the rise and the run using two of the line's points.
The phrases "rise" and "run" are used to indicate height differences between two sites. for a - a - a - the - the - the - the Run is equal to rise plus slope. Slope is the result of adding rise and run.
The sum of cubes problem is the solution to the equation [tex]x3+y3+z3=k.[/tex] Although the equation appears simple.
It becomes exponentially more challenging to answer when it is phrased as a "Diophantine equation" the values for x, y, and z must all be whole numbers for any value of k in the issue.
Therefore, The equation [tex]y = -x + 3[/tex] has a y-intercept of 3, and its slope is -1. In addition, 3 is the x-intercept of the line [tex]y = -x + 3.[/tex]
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CAN SOMEONE HELP WITH THIS QUESTION?✨
The base of the triangle is decreasing at a rate of 36/19 cm/min when the altitude is 9.5 cm and the area is 94 sq cm.
What does calculus' chain rule mean?We can differentiate composite functions using the chain rule in calculus. Any function that is created by fusing two or more other functions is referred to as a composite function. According to the chain rule, if y = f(g(x)), and f and g are both differentiable functions, then the derivative of y with respect to x is given by:
dy/dx = f'(g(x)) * g'(x)
Given that, the altitude is 9.5 cm and the area is 94 sq cm.
The area of the triangle is given as:
A = 1/2(b)(h)
Differentiating both sides with respect to time we have:
dA/dt = 1/2[(db/dt)(h) + b(dh/dt)
Now,
dA/dt = 2 and dh/dt = 2.
Substituting the values we have:
2 = (1/2) * (db/dt * 9.5 + b * 2)
4 = db/dt * 9.5 + 2b......(1)
Using the area of triangle we know that:
Area = (1/2) * b * h
94 = (1/2) * b * 9.5
b = 20
Substituting the value of b in equation 1 we have:
4 = db/dt * 9.5 + 40
db/dt = - 36/19 cm/min
Hence, the base of the triangle is decreasing at a rate of 36/19 cm/min when the altitude is 9.5 cm and the area is 94 sq cm.
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• Can you stop checking for factor pairs when you find a pair
that repeats? Explain.
Yes, you can stop checking for factor pairs when you find a pair that repeats.
What are factor pair rules?A factor pair is defined in mathematics as a set of two factors that, when multiplied together, produce a specific product. In other words, it is a set of two numbers that we multiply to get a product. For example, in the multiplication statement, 6 7 = 42, 6 and 7 is one of the factor pairs that gives us the product 42.
This is due to the fact that each number has a unique set of factors. When you find a factor pair that repeats, you know you've found all of the factors of that number. Any additional pairs you find will simply be a permutation of the same factors you've already discovered.
Consider the number 24 as an example. Its components are as follows:
1, 2, 3, 4, 6, 8, 12, 24
When looking for factor pairs, we begin with 1 and 24, then move on to 2 and 12, 3 and 8, and finally 4 and 6. We now have all of the factors of 24 because we discovered a pair (4, 6) that repeats the same factors as an earlier pair (6, 4).
As a result, once you find a pair of factors that repeats, you can be confident that you have discovered all of the factors of the number you are investigating.
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