The area of a triangle is 27 square feet, the length of the base of the triangle will be 3√2 feet, and the height of the triangle will be 9√2 feet.
Let b be the length of the base of the triangle, and let h be its height. We know that the area of the triangle is 27 square feet, so we have:
(1) (1/2)bh = 27
We also know that the height of the triangle is three times the length of its base, so we have:
(2) h = 3b
Substituting (2) into (1), we get:
(1/2)b(3b) = 27
Simplifying, we get:
[tex](3/2)b^2[/tex]=27
Dividing both sides by 3/2, we get:
[tex]b^2[/tex] = 18
Taking the square root of both sides, we get:
b = ±√18
Since the length of a base cannot be negative, we take the positive square root and get:
b = √18 = 3√2
Substituting this value into (2), we get:
h = 3b = 3(3√2) = 9√2
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I need answer now 20 point d
a
if you flip it the c point will be the opposite of the original coordinates
Find the solution to the system of equations.
-2x+2y=-4
3z + 3y = -18
The solution to the system of equations is x = -1 and y = -3
How to determine the solutionFrom the question, we have the following parameters that can be used in our computation:
-2x+2y=-4
3x + 3y = -18
Multiply (1) by 1.5
So, we have the following representation
-3x + 3y = -6
3x + 3y = -18
Add the equations
6y = -24
So, we have
y = -3
This means that
-2x + 2(-3) = -4
Evaluate
2x = -2
Divide
x = -1
Hence, the value of x is -1
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Monroe is tracking the circular path of a satellite in the sky using his telescope. He determined that the satellite has formed an arc of 32° in one hour. The satellite is 36,000 km above the earth's surface. How far did the satellite travel in the one-hour period to the nearest kilometer?
Answer Choices:
1) 1,400 km
2) 10,053 km
3)20,106 km
4)72,382 km
To calculate the distance traveled by the satellite, we need to find the circumference of the circle it traces in the sky. The circumference can be found using the formula:
C = 2 * π * r
where r is the radius of the circle (i.e., the distance from the center of the earth to the satellite), and π is pi, approximately equal to 3.14.
r = 36,000 km
C = 2 * π * 36,000 km
C = 72,000 * π km
Next, we need to find what fraction of the circumference the satellite has traveled in one hour. This is given by the fraction of the total circle the satellite has traced, which is equal to the angle it has formed divided by 360°.
fraction = 32° / 360°
Finally, we can multiply the circumference by the fraction to find the distance traveled by the satellite:
distance = C * fraction
distance = 72,000 * π * 32° / 360° km
Rounding the result to the nearest kilometer, the satellite has traveled approximately:
distance = 73,382 km
So, the satellite traveled approximately 73,382 km in one hour.
Please help me,this is proportionality theorems
Answer:
Below
Step-by-step explanation:
Line DE grows to 5 as you move to the midpoints of BC and AC....
go the the other half of the way to the end AB and it grows another 5 for a total of 10
Find an autonomous differential equation with all of the following properties:equilibrium solutions at y=0 and y=3,y' > 0 for 0 y' < 0 for -inf < y < 0 and 3 < y < infdy/dx =
An autonomous differential equation with equilibrium solutions at y=0 and y=3, and y' > 0 for 0 < y < 3 and y' < 0 for -inf < y < 0 and 3 < y < inf is dy/dx = 3y(1-y).
An autonomous differential equation is a type of ordinary differential equation that does not depend on any other variable but time. It has a single variable, usually denoted as y, and a single independent variable, usually denoted as t or x. An autonomous differential equation with equilibrium solutions at y=0 and y=3, and y' > 0 for 0 < y < 3 and y' < 0 for -inf < y < 0 and 3 < y < inf is dy/dx = 3y(1-y). This equation will have two equilibrium solutions at y=0 and y=3. The derivative of the equation, y’, is greater than 0 for 0 < y < 3, which means that the equation is increasing in this range. The derivative of the equation is less than 0 for -inf < y < 0 and 3 < y < inf, which means that the equation is decreasing in this range. This equation is a type of logistic equation and is often used to model population growth. It is also used to describe other phenomena such as the spread of an epidemic or the number of species in an ecosystem. Using the initial conditions y(0) = 2 and y(1) = 3, we can calculate the values of y at other time points using the equation dy/dx = 3y(1-y). At t=0.5, the value of y is y(0.5) = 2.5; at t=1.5, the value of y is y(1.5) = 2.875; and at t=2.5, the value of y is y(2.5) = 2.9375.
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What was the difference between the highest guess and the lowest guess? Write your answer as a fraction, mixed number, or whole number
The difference between the highest guess and the lowest guess, in the whole number, is 120.
What is subtraction?Subtraction is a mathematical operation. Which is used to remove terms or objects in the expression.
Given:
A table that shows the relationship between the guessed amount and the number of weeks.
Week Amount
1 120
2 140
3 160
4 240
Here, the highest guess is 240.
And the lowest guess is 120.
The difference between the highest guess and the lowest guess,
= 240 - 120
= 120
120 is a whole number.
Therefore, 120 is the required number.
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The complete question:
A table that shows the relationship between the guessed amount and the number of weeks.
Week Amount
1 120
2 140
3 160
4 240
What was the difference between the highest guess and the lowest guess? Write your answer as a fraction, mixed number, or whole number
Evaluate 3y - x if x = 4 and y = 3
3(3)-4 = 5
Hope this helped
state the domain and range of the following function. describe the transformations to the basic function. then, write the equations of each of the function.
The equation for line 1 is y = x+6 and equation for line 2 is y= -x-4. The domain and range is as follows,
y = x+6 {(x,y)| x≤ -5 , y≤ 1}
y= -x-4 {(x,y) x≥-5, y≤1}
The line 1 passes through points (-6,0) and (-5,1).
Equation for a line is y= Ax+B
Using two points we can formulate the following equations
-6A+B =0
-5A+B =1
Subtracting the two equations,
-A = -1, so A= 1
-6A+B = 0
-6 ×1 + B = 0
B= 6
So the equation for the line by substituting values of A and B is
y= x+6
The domain is all values ≤-5 and range is all values ≤1
The line 2 passes through (0,-4) and ( -5,1)
Formulating equations using points
B= -4
-5A+B =1
A = -1
Substituting in equation for line 2
y = -x-4
The domain is all values ≥ 5 and range is all values ≤1.
So the equation, domain and range of line 1 is y = x+6 {(x,y)| x≤ -5 , y≤ 1} and for line 2 is y= -x-4 {(x,y) x≥-5, y≤1}
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The complete question is included as image
Which dotted line segment correctly represents the perpendicular bisector of line segment XY?
AB
CD
GF
TW
AB line segment correctly represents the perpendicular bisector of line segment XY.
What is Line segment?Line segment is the part of line which have two endpoint and bounded by two distinct end points and it contain every point on the line which is between its endpoint.
Given that;
There are 4 doted lines are shown.
Now, From all dotted line;
Line segment AB divides the line segment XY into two equal parts.
Hence, AB line segment correctly represents the perpendicular bisector of line segment XY.
Thus, ''AB line segment'' correctly represents the perpendicular bisector of line segment XY.
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Let f be a function defined and continuous on the closed interval [a,b]. If f has a relative maximum at c and a < c < b, which of the following statements must be true? f(c) exists. If f'(c) exists, then f'(c) = 0. If f"(c) exists, then f"(c) LE 0. II only III only I and II only I and III only II and III only
Given that function f is defined and continuous on the closed interval [a,b], the correct statements are:
f(c) existsif f'(c) exists, then f'(c) = 0 (C. I and II only)From the case we know that:
function f is on the closed interval [a,b]
c = relative maximum
A function reach its relative maximum when its first derivative function is equal to zero (0). Since c is the relative maximum of function f, then:
f'(c) = 0
The third statement is wrong because when c is the relative maximum point, then its second derivative function must be lower than zero (0), or:
f''(c) < 0
When the second derivative function is greater than zero (0), it indicates that the given critical point is the relative minimum.
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find the volume of a pyramid with height 28 and rectangular base with dimensions 2 and 7 using integration
The volume of a pyramid can be calculated using integration is [tex]V = (1/3)(7*282 - 2*282) = 224 cubic units..[/tex]
The formula for the volume of a pyramid with a rectangular base with dimensions l and w, and height h is given by V = (lwh)/3. Using this formula, the volume of a pyramid with a rectangular base with dimensions 2 and 7 and height 28 can be calculated to be 224 cubic units.
To calculate this using integration, we can use the formula V = (1/3)∫b a y2dx, where a and b are the lower and upper limits of the rectangular base, and y is the height of the pyramid. In this case, a = 2, b = 7, and y = 28. Therefore, V = (1/3)(7*282 - 2*282) = 224 cubic units.
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everybody help i just need to pass today mwa
Answer:
20
Step-by-step explanation:
Easiest way to solve is to consider the formula for the area of the trapezoid, which is 0.5h(a+b), where h is the altitude and a and b are the two bases.
Here we know the area, the altitude and one base so let's sub these in to find the other base:
92=0.5*8*(3+b)
92=4(3+b)
23=4+b
b=20
Stefan wants to graph a system of two linear equations to find the solution. Which
statement about the graph of the system is true?
A. If the graph of the system shows parallel lines, then there are infinite
solutions.
B. If the graph of the system shows only one line, then there are infinite
solutions.
C. If the graph of the system shows perpendicular lines, then there are no
solutions.
O
D. If the graph of the system shows lines that cross through the origin, then
there are no solutions.
Answer: The correct answer is A. If the graph of the system shows parallel lines, then there are infinite solutions.
When two linear equations in the system have the same slope and different y-intercepts, the lines will be parallel and will never intersect. This means that there is no solution to the system.
On the other hand, when two linear equations in the system have different slopes, the lines will intersect at exactly one point, which is the unique solution to the system.
So, in summary:
Parallel lines: no solution
Intersecting lines: one solution
Infinite solutions: lines are the same.
Step-by-step explanation:
NEED HELP FAST I WILL GIVE THE BRAINLIEST AND 15 pts
The length of PJ in the right triangle PNJ is determined as 24 inches.
How to calculate the length of PJ?The length of PJ is calculated by applying Pythagoras theorem as follows;
PJ² = PN² + NJ²
The given parameters;
NJ = 10 in
The length of PN = The length of PL = The length of PM
PL = 3x + 4
PM = 6x - 14
3x + 4 = 6x - 14
3x - 6x = -14 - 4
-3x = -18
x = 18/3
x = 6
Length PN = 3x + 4
PN = 3(6) + 4
PN = 22
Length PJ is calculated as follows;
PJ² = PN² + NJ²
PJ² = 22² + 10²
PJ² = 584
PJ = √584
PJ = 24.17 in
PJ ≈ 24 in
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Write the expression -13y+7-11-4y as a um
-13y + 7 - 11 - 4y can be written as -17y - 11.
What is expression?Expression is a way of conveying emotions, thoughts, or ideas through verbal or nonverbal means. It is often used to communicate an individual's feelings, beliefs, or opinions, and can be expressed through language, art, music, dance, and other forms of communication. Expression can be used to convey a wide range of emotions, from joy and excitement to anger and sorrow. Expression is an essential part of communication, and without it, we would not be able to effectively convey our thoughts, feelings, and desires. The way we express ourselves can also be a reflection of our personality and can give people an insight into who we are. Expression is also important for self-expression, as it allows us to explore our own thoughts and emotions, and express them in a way that may be more comfortable for us.
This can further be written as -17y × (-1) - 11. Therefore, the expression can be written as a multiplication as -17y × (-1) - 11.
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A pyramid has a triangular base with side lengths 20, 20, and 24. The three edges of the pyramid from the three corners of the base to the fourth vertex of the pyramid all have length 25. The volume of the pyramid is myn, where m and n are positive integers, and n is not divisible by the square of any prime. Find m + n. n
The volume of the pyramid is mn, where m and n are positive integers, and n is not divisible by the square of any prime then m+n is 803.
Let the triangular base be ΔABC with
AB = 24, Altitude to the side AB is 16
Area of ΔABC is 24x16/2 = 192
Let fourth vertex of Tetrahedron be P and let the midpoint of AB be M
ΔABC will pass through circumcenter of Δ ABC which we will call O
OM + OC = 16
OM = d
d = √d² + 144 = 16
2d² + 2d√d² + 144 = 112
2d(d + √d² + 144) = 112
d = 7/2
Now, we find √d² + 144 = 25/2
Theorem , on the triangle AOP, BOP, COP
25² = h² + (25/2)²
625 = h² + 625/4
h = 25√3/2
Finally the formula for volume of Pyramid from
V = Ah/3
= 192 (25√3/2) / 3
= 800√3
m + n = 800 + 3
m + n = 803
Therefore, the value of m+n is 803.
The volume of a aggregate depends upon the type of aggregate’s base, whether it's a triangle, square or cube. A aggregate is a polyhedron figure which has only one base.
The base of the aggregate is a poly sided figure. Hence, the formula to find not only volume but also the face area of a aggregate will be grounded on the structure of its base and height of the aggregate.
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Select the correct answer.
Select the largest decimal.
1,238.308
1,238.83
1,283.083
1,233.38
1,283.803
Answer:1,283.803
Step-by-step explanation:
frank invests $2,500 in an account that has an annual interest rate of 5.4% compounded continuously. hannah invests $3,000 in an account that has an annual interest rate of 3.2% compounded quarterly. which of the following statements is true when comparing the amount of money in the two accounts after 10 years?
The statement that is true when comparing the two accounts after 10 years is: A: "Hannah's account has more money than Frank's account".
To compare the amount of money in the two accounts after 10 years, we can use the formula for continuous compound interest:
A = Pe^(rt)
where A is the amount of money in the account after t years, P is the principal (initial amount), r is the annual interest rate (expressed as a decimal), and e is the mathematical constant approximately equal to 2.71828.
For Frank's account, we have:
A = 2500e^(0.05410) = 4244.96 dollars (rounded to the nearest cent)
For Hannah's account, we have to take into account the quarterly compounding. The formula for quarterly compound interest is:
A = P(1 + r/n)^(nt)
where n is the number of compounding periods per year (4 for quarterly compounding), and t is the time in years. Thus, we have:
A = 3000*(1 + 0.032/4)^(4*10) = 4412.09 dollars (rounded to the nearest cent)
Therefore, the amount of money in Hannah's account after 10 years is greater than the amount in Frank's account.
"
Complete question
frank invests $2,500 in an account that has an annual interest rate of 5.4% compounded continuously. hannah invests $3,000 in an account that has an annual interest rate of 3.2% compounded quarterly. which of the following statements is true when comparing the amount of money in the two accounts after 10 years?
A: Hannah's account has more money than Frank's account
B: : Frank's account has more money than Hannah's account
"
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Set up the integral that uses the method of disks/washers to find the volume V of the solid obtained by rotating the region bounded by the given curves about the specified lines. y = 3 root x, y = 3x A) About the y-axisB) About the line y=3
Answer:
See below for answers
Step-by-step explanation:
Part A
[tex]\displaystyle V=\pi\int\limits^d_c {(R^2-r^2)} \, dy\\=\pi\int\limits^3_0 {\biggr(\biggr(\frac{y^2}{9}\biggr)^2-\biggr(\frac{y}{3}\biggr)^2\biggr)} \, dy\\=\pi\int\limits^b_a {\biggr(\frac{y^4}{81}-\frac{y^2}{9}\biggr)} \, dy[/tex]
Make sure to write the functions in terms of y since you rotate on a vertical axis.
Part B
[tex]\displaystyle V=\pi\int\limits^b_a {(R^2-r^2)} \, dx\\=\pi\int\limits^1_0 {((3-3\sqrt{x})^2-(3-3x)^2)} \, dx\\=\pi\int\limits^1_0 {((9-18\sqrt{x}+9x)-(9-18x+9x^2))} \, dx\\=\pi\int\limits^1_0 {(-18\sqrt{x}-9x-9x^2)} \, dx[/tex]
Make sure to fix the radii so they start at y=3.
What informational text is an expression of an opinion on a subject?
A. Autobiography
B. Essay
C. Biography
D. Editorial
The informational text that is an expression of an opinion on a subject is an essay. That is option B
What is an essay?An essay is defined as the piece of writing or a literary write up that is used to represent the writer's opinion about a subject that is under study.
There are different types of easy written that includes the following:
argumentative essay,expository essay,narrative essay, and descriptive essay.Therefore, easy is an informational text that is an expression of an opinion on a subject.
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which has the lowest unit rate
$0.27: 1
$ 0.18:1
$0.21:1
A
D
In parallelogram
m
(2x +12)
5x°
B
C
ABCD, m
Find the value of X
and of
Answer:
x = 24
Step-by-step explanation:
In a parallelogram, adjacent angles are supplementary.
∠B + ∠C = 180°
5x + 2x + 12 = 180
7x + 12 = 180
Subtract 12 from both sides,
7x = 180 - 12
7x = 168
Divide both sides by 7,
x = 168 ÷7
[tex]\boxed{x = 24^\circ}[/tex]
Given the diagram find the measurement of AED
A.110°
B.116°
C.118°
D.123°
Note that the measure of ∠AED is 123°. (Option D) This is arrived at using the properties of a 4 sided polygon and angles on a straight light postulate.
What is a polygon?A polygon is a planar figure characterized by a limited number of straight line segments joined to create a closed polygonal chain in geometry. A polygon is defined as a bounded planar region, a bounding circuit, or both. A polygonal circuit's segments are known as its edges or sides.
We know that the sum of angles in a polygon is 360°
Since ∠ABD = 46°
That is Sum of Angles in ΔBDC Less (79+57) =
180 - (101)
= 46°
And ∠EDB = 180-79 (angles on a straight line)
⇒ ∠EDB = 101°
And ∠BAE = 90° (Given)
Thus,
∠AED = 360 - 90-46-101; Thus
∠AED = 123°
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Consider randomly selecting a student at a large university, and let A be the event that the selected student has a Visa card and B be the analogous event for MasterCard. Suppose that P(A) = 0.7 and P(B) = 0.4.
A. Could it be the case that P(A ∩ B) = 0.5? Pick one:
i. Yes, this is possible. Since B is contained in the event A ∩ B, it must be the case that P(B) ≤ P(A ∩ B) and 0.5 > 0.4 does not violate this requirement.
ii. Yes, this is possible. Since A ∩ B is contained in the event B, it must be the case that P(B) ≤ P(A ∩ B) and 0.5 > 0.4 does not violate this requirement.
iii. No, this is not possible. Since B is equal to A ∩ B, it must be the case that P(A ∩ B) = P(B). However 0.5 > 0.4 violates this requirement.
iiii. No, this is not possible. Since B is contained in the event A ∩ B, it must be the case that P(A ∩ B) ≤ P(B). However 0.5 > 0.4 violates this requirement.
v. No, this is not possible. Since A ∩ B is contained in the event B, it must be the case that P(A ∩ B) ≤ P(B). However 0.5 > 0.4 violates this requirement.
A) No, P(A ∩ B) = 0.5, is not possible. In this case that P(A ∩ B) ≤ P(B). So, the correct choice is option (iii).
B) Probability that the selected student has at least one of these two types of cards is 0.8.
The probability of an event has different properties. If two events take place at the simultaneously, then we calculate their joint probabilities. The individual probabilities are called the marginal probabilities. Let us consider two events :
A : Event that the selected student has Visa card
B : Event that selected student has Master Card
Probability of occurrence of event A, P(A) =0.7
Probability of occurrence of event B, P(B) =0.4
A) P(A ∩ B) = 0.5 ,
No, this is not possible. Since, B is contain in the event (A ∩ B), it must be the case that
P( A ∩ B)≤ P(B). However, 0.5 > 0.4, violate this requirement. So, correct choice is option (iii).
B) Now, it is specific that the probability A and B is 0.3. The probability that the selected student has atleast one of these two types of cards will be, P(A∪B)
= P(A) + P(B) − P(A∩B)
= 0.7 + 0.4v− 0.3 = 0.8
So the probability is 0.8.
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Complete question:
Consider randomly selecting a student at a large university, and let A be the event that the selected student has a Visa card and B be the analogous event for MasterCard. Suppose that P(A) = 0.7 and P(B) = 0.4.
A) Could it be the case that P(A ∩ B) = 0.5? Pick one:
i. Yes, this is possible. Since B is contained in the event A ∩ B, it must be the case that P(B) ≤ P(A ∩ B) and 0.5 > 0.4 does not violate this requirement.
ii. Yes, this is possible. Since A ∩ B is contained in the event B, it must be the case that P(B) ≤ P(A ∩ B) and 0.5 > 0.4 does not violate this requirement.
iii. No, this is not possible. Since B is equal to A ∩ B, it must be the case that P(A ∩ B) = P(B). However 0.5 > 0.4 violates this requirement.
iiii. No, this is not possible. Since B is contained in the event A ∩ B, it must be the case that P(A ∩ B) ≤ P(B). However 0.5 > 0.4 violates this requirement.
v) No, this is not possible. Since A ∩ B is contained in the event B, it must be the case that P(A ∩ B) ≤ P(B). However 0.5 > 0.4 violates this requirement.
B) From now on, suppose that P(A ∩ B)
= 0.3. What is the probability that the selected student has at least one of these two types of cards?
What is the correct answer
C = 45 + 0.25t. The 45 represents the baseline amount that she is charged per month. The t represents each additional text, and the 0.25 represents how much she is charged for each additional text.
Determine whether or not each of the following continuous-time signals is periodic. If the signal is periodic, determine its fundamental period. (a) x(t) 3 cos(4t (c) x(t) = [cos(2t--)]2 (d) x(t) &'{cos(4m)u(t)} + 풀) (b) x(t) e/m-I)
The signal, (a) x(t) = 3cos(4t) is periodic with period T = pi/2. To see this, we can compute:
x (t + T) = 3cos (4(t + pi/2)) = 3cos (4t + 2pi) = 3cos(4t)
which shows that the signal repeats itself every T = pi/2 seconds.
[tex](b) \times (t) = e^{( - t)} [/tex]
This signal is not periodic.
[tex]e^{(-t)} = e^{(-(t+T))} [/tex]
for all t.
However, this is not possible since e^(-t) approaches 0 as t approaches infinity. Therefore, the signal is not periodic.
[tex](c) \times (t) = [cos (2t - \frac{\pi}{3}] ^2[/tex]
This signal is periodic with period T = pi. To see this, we can compute:
[tex]x (t + T) = [cos (2(t + \pi) - \pi/3)] ^2 = [cos (2t + 5\pi/3)] ^2 = [cos (2t - pi/3)] ^2 = x(t) \\
(d) x(t) = cos(4t) u(t) + sin(4t) u(-t)[/tex]
This signal is not periodic. To see this, suppose that there exists a period T such that x(t) = x (t + T) for all t. Then we must have:
cos(4t) u(t) + sin(4t) u(-t) = cos(4(t+T)) u(t+T) + sin(4(t+T)) u(-(t+T)) for all t.
However, this is not possible since the two terms on the left-hand side have different signs for t < 0, whereas the two terms on the right-hand side have the same sign for t < -T.
Therefore, the signal is not periodic.
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Use the Quotient Rule to find the derivative of the given function Simplify your answers. 31. f(x) =x^4 +1/x^3 32. f(x) = x^5 -1/x^2 33. f(x) = x+1/x-134. f(x) = x - 1/x + 1 35. f(x) = 3x + 1/2+x36. f(x) = x+1/ 2x^2 +1 37. f(t) = t^2 -1/t^2 +1 38. f(t) = t^2 + 1/ t^2 - 1
By the quotient rule the derivative of all functions can be found in an easy way,
(1) [tex]f'(x)=\frac{x^6+128x^3-3x^2}{(x^3+32)^2}[/tex]
(2) [tex]f'(x)=\frac{5}{(2+x)^2}[/tex]
(3) [tex]f'(t)=\frac{4t}{(t^2+1)^2}[/tex]
The Quotient Rule in calculus is a technique for figuring out a function's derivative (differentiation) as the ratio of two differentiable functions. It is a formal rule applied to issues involving differentiation where one function is split in half by another function. The definition of the limit of the derivative is followed by the quotient rule. Keep in mind that the bottom function is where the quotient rule starts and where it finishes.
The quotient rule is similar to the product rule. A Quotient Rule is stated as the ratio of the quantity of the denominator times the derivative of the numerator function minus the numerator times the derivative of the denominator function to the square of the denominator function. In short, the quotient rule is a way of differentiating the division of functions or the quotients
We have the functions
(1) [tex]f(x)=\frac{x^4+1}{x^3+32}[/tex]
derivative with respect to x by the quotient rule.
[tex]f'(x)=\frac{(x^3+32)(4x^3)-(x^4+1)(3x^2)}{(x^3+32)^2}\\\\f'(x)=\frac{4x^6+128x^3-3x^6-3x^2}{(x^3+32)^2}\\\\f'(x)=\frac{x^6+128x^3-3x^2}{(x^3+32)^2}[/tex]
2) derivative with respect to x of the below function
[tex]f(x)=\frac{3x+1}{2+x}\\\\f'(x)=\frac{(x+2)(3)-((3x+1))}{(2+x)^2}\\\\f'(x)=\frac{5}{(2+x)^2}[/tex]
3)
[tex]f(t)=\frac{t^2-1}{t^2+1}[/tex]
derivative with respect to t,
[tex]f'(t)=\frac{(t^2+1)(2t)-(t^2-1)(2t)}{(t^2+1)}\\\\f'(t)=(2t^3+2t-2t^3+2t)/(t^2+1)^2\\\\f'(t)=4t/(t^2+1)^2[/tex]
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david buys fruits and vegetables wholesale and retails them at davids produce. one of the more difficult decisions is the amount of bananas to buy. let us make some simplifying assumptions, and assume that david purchases bananas once a week at 10 cents per pound and retails them at 30 cents per pound during the week. bananas that are more than a week old are too ripe and are sold for 5 cents per pound. suppose the demand for the good bananas follows the same distribution as d given in the first question. assume that david buys 8 pounds of banana every week.
The expected profit per week for David is $4.25, with a standard deviation of $4.28.
Based on the given information, David purchases 8 pounds of bananas every week at 10 cents per pound, which costs $0.80 per week. The demand for good bananas follows the same distribution as d given in the first question. Using the probabilities given in d, we can calculate the expected revenue from selling the bananas. The expected revenue from selling good bananas is (0.30.6 + 0.050.3) * 8 = $1.56. The expected revenue from selling bad bananas is 0.05 * 8 = $0.40.
Thus, the expected total revenue is $1.96. The expected profit is the difference between the total revenue and the cost of purchasing the bananas, which is $1.16. The standard deviation of the profit can be calculated using the formula for the standard deviation of a linear combination of random variables, which gives a standard deviation of $4.28.
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Consider two connected tanks shown below. Tank 1 initially contains 300 L of brine (with unknown concentration), while tank 2 initially contains 300 L of pure water. Pure water flows into tank 1 at the rate of 500 L/hr into tank 1. The mixture in tank 1 flows into tank 2 at the rate of 500 L/hr, and the mixture in tank 2 leaves tank 2 at the same rate.
Describe how the amount of salt in tank 1 and tank 2 change over time.
Let x1(t) and x2(t) be the mass (in oz) of salt in tank 1 and tank 2, respectively. Solve x1(t) and x2(t).
Determine when the amount of salt in tank 2 reaches its maximum. (Note that the answer does not depend on the initial concentration in tank 1!)
We have also determined when the amount of salt in tank 2 reaches its maximum, which is when[tex]e^{t/180} = 6, \text{or}[/tex] t ≈ 1,080 minutes.
A mixture is a combination of two or more substances that are physically intermingled with each other, but not chemically bonded.
To determine when the amount of salt in tank 2 reaches its maximum, we can set the derivative of x2(t) with respect to time to zero and solve for t.
[tex]dx_2(t)/dt = (x_1(t)/500) * 500 * (1/180) * e^{t/180} - (x_2(t)/300) * 500 * (1/180) * e^{t/180} = 0[/tex]
Simplifying, we get:
[tex]x_1(t) * e^{-t/180} - (300/5) = x_2(t)[/tex]
Substituting the expression for x2(t) in terms of x1(t), we get:
[tex]x_1(t) * e^{-t/180} - (300/5) = (x_1(t) - (300/5)) * e^{t/18} + (300/5)[/tex]
Simplifying, we get:
[tex]2x_1(t) * e^{-t/180} = (600/5) * e^{t/180}[/tex]
Dividing by [tex]e^{t/180}[/tex] on both sides, we get:
[tex]2x_1(t) * e^{-t/180 - t/180} = (600/5)[/tex]
Simplifying, we get:
[tex]x_1(t) = (300/5) * e^{t/180}[/tex]
Substituting this value of x₁(t) in the expression for x₂(t), we get:
[tex]x_2(t) = (300/5) * (e^{t/180} - 1)[/tex]
This expression for x₂(t) gives us the amount of salt in tank 2 at any time t, and we can see that it increases with time until it reaches its maximum value of 300 oz. This occurs when [tex]e^{t/180}=6,[/tex], or t ≈ 1,080 minutes (or 18 hours), which is independent of the initial concentration in tank 1.
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PLEASE HELP DUE ASAP!
The graph of the function f(x) = 3√(3 - x) is at the end of the answer.
How to graph the function?We want to graph the function f(x) = 3√(3 - x)
To do so, we need to find some points on that line, to find the points we need to evaluate the function in some values of x
if x = -1
f(-1) = 3√(3 + 1) = 3*2 = 6
if x = 3
f(3) = 3√(3 - 3) = 3*0 = 0
if x = -6
f(-6) = 3*√(3 + 6) = 3*3 = 9
if x = -13
f(-13) = 3*√(3 + 13) = 3*4 = 12
Then the points are (-1, 6), (3, 0), (-6, 9), (-13, 12)
Now we can just graph these 4 points and connect them with a curve, the graph of the function is below.
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