The position of the particle moving in the x-y plane is given by the parametric functions x(t) and y(t), where = t sin(n t'') and (3t+1). The position of the particle is (2) , 7) at time t = 3.
In mathematics, a parametric equation defines a set of quantities as a function of one or more independent variables called parameters. [1] Parametric equations are often used to represent the coordinates of points that constitute geometric objects such as curves or surfaces, called respectively parametric curves and parametric surfaces. In this case, the equations are collectively referred to as the object's parametric representation or parameter system or parametrization (or orthographic parametrization)
The velocity of the particle is zero at t = 1 second
v(x) = dx/dt
= d/dt (3t²- 6t)
= 6t−6.
At t = 1, v(x) = 0
v(y) =dy/dt
= d/dt (t²−2t)
=2t−2.
At t=1,
v(y) = 0
Hence v = [tex]\sqrt{v_x^2 + v_y^2}[/tex] = 0
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How many different strings of length 12 containing exactly five a's can be chosen over the following alphabets? (a) The alphabet {a,b) (b) The alphabet {a,b,c}
There are 792 strings across a,b, and 27,720 in a,b,c.
(a) We must select five slots for a's in an alphabet of "a,b" before filling the remaining spaces with "b's." Hence, the binomial coefficient is what determines how many strings of length 12 that include precisely five as:
C(12,5) = 792
As a result, there are 792 distinct strings of length 12 that include exactly five a's across the letters a, b.
(b) We may use the same method as before for an alphabet consisting of the letters "a,b,c." The first five slots must be filled with a's, followed by three b's, and the final four positions must be filled with c's. The number of strings of length 12 that contain exactly five a's across the letters "a," "b," and "c" is thus given by:
C(12,5) * C(7,3) = 792 * 35 = 27720
Thus, there are 27,720 distinct strings.
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Find the standard normal area for each of the following(round your answers to 4 decimal places)
Answer:
(a) 0.0955
(b) 0.0214
(c) 0.9545
(d) 0.3085
Step-by-step explanation:
You want the area under the standard normal PDF curve for intervals (1.22, 2.15), (2.00, 3.00), (-2.00, 2.00), and (0.50, ∞).
CalculatorThe probability functions of a suitable calculator or spreadsheet can find these values for you. The attachment shows one such calculator. Its "normalcdf" function takes as arguments the lower bound and upper bound.
We used 1E99 as a stand-in for "infinity" as recommended by the calculator's user manual. For the purpose here, any value greater than 10 will suffice.
slope of secant line=?
slope of secant line=?
slope of tangent line=?
y=?
Therefore, the equation of the tangent line at (5,f(5)) is y = 18x - 65.
What is slope?In mathematics, the slope of a line is a measure of its steepness or incline, usually denoted by the letter m. It describes the rate of change of a line in the vertical direction compared to the horizontal direction. The slope of a line can be positive, negative, zero, or undefined, depending on the angle it makes with the horizontal axis. The slope of a line is commonly calculated as the ratio of the change in the y-coordinates to the change in the x-coordinates between any two points on the line.
Here,
(A) The slope of the secant line joining (2,f(2)) and (7,f(7)) is given by:
slope = (f(7) - f(2)) / (7 - 2)
We can find f(7) and f(2) by substituting 7 and 2, respectively, into the function f(x):
f(7) = 7² + 8(7) = 49 + 56 = 105
f(2) = 2² + 8(2) = 4 + 16 = 20
Substituting these values into the formula for the slope of the secant line, we get:
slope = (105 - 20) / (7 - 2) = 85 / 5 = 17
Therefore, the slope of the secant line joining (2,f(2)) and (7,f(7)) is 17.
(B) The slope of the secant line joining (5,f(5)) and (5+h,f(5+h)) is given by:
slope = (f(5+h) - f(5)) / (5+h - 5) = (f(5+h) - f(5)) / h
We can find f(5) and f(5+h) by substituting 5 and 5+h, respectively, into the function f(x):
f(5) = 5² + 8(5) = 25 + 40 = 65
f(5+h) = (5+h)² + 8(5+h) = 25 + 10h + h² + 40 + 8h = h² + 18h + 65
Substituting these values into the formula for the slope of the secant line, we get:
slope = ((h² + 18h + 65) - 65) / h = h² / h + 18h / h = h + 18
Therefore, the slope of the secant line joining (5,f(5)) and (5+h,f(5+h)) is h+18.
(C) The slope of the tangent line at (5,f(5)) is equal to the derivative of the function f(x) at x=5. We can find the derivative of f(x) as follows:
f(x) = x² + 8x
f'(x) = 2x + 8
Substituting x=5, we get:
f'(5) = 2(5) + 8 = 18
Therefore, the slope of the tangent line at (5,f(5)) is 18.
(D) The equation of the tangent line at (5,f(5)) can be written in point-slope form as:
y - f(5) = m(x - 5)
where m is the slope of the tangent line, which we found to be 18. Substituting the values of m and f(5), we get:
y - 65 = 18(x - 5)
Simplifying, we get:
y = 18x - 65
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13/16+2 1/12+2 3/24
dfsklhgdfehuiorgjrgiy
Answer:
Fraction: 241/48
Improper fraction: 5 1/48
Decimal: 5.021
Step-by-step explanation:
To calculate the expression 13/16+2 1/12+2 3/24, I first converted the mixed numbers 2 1/12 and 2 3/24 to improper fractions. 2 1/12 is equal to 25/12 and 2 3/24 is equal to 51/24. Then, I added the three fractions 13/16, 25/12, and 51/24 by finding a common denominator, which in this case is 48. So, the expression becomes (39/48)+(100/48)+(102/48), which simplifies to (39+100+102)/48, which equals 241/48. Finally, I converted the improper fraction 241/48 to a mixed number, which is equal to 5 1/48.
4.33. Find the moment-generating function of the continuous random variable
X
whose probability density is given by
f(x)={ 1
0
for 0
elsewhere
and use it to find
μ 1
′
,μ 2
′
, and
σ 2
.
The moment-generating function of the continuous random variable X whose probability density is given by f(x) = 1 for 0 elsewhere is M(t) = 1, and its first and second central moments, μ1′ and μ2′, and the variance, σ2, are 0, 0 and 0 respectively.
The moment-generating function of the continuous random variable X whose probability density is given by f(x) = 1 for 0 elsewhere is M(t) = 1.
Using M(t) we can calculate the first and second central moments, μ1′ and μ2′, and the variance, σ2, as follows:
μ1′ = M′(t) = 0
μ2′ = M′′(t) = 0
σ2 = μ2′ - (μ1′)2 = 0 - (0)2 = 0.
Therefore, the first and second central moments, μ1′ and μ2′, and the variance, σ2, of the continuous random variable X with probability density f(x) = 1 for 0 elsewhere are 0, 0 and 0 respectively.
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Find the sum-of-products expansions of the Boolean function F (x, y, z) that equals 1 if and only if a) x = 0. b) xy = 0. c) x + y = 0. d) xyz = 0.
a) F(x,y,z) = y'z'. b) F(x,y,z) = x'y'z' + x'y'z + xy'z'. c) F(x,y,z) = x'y'z'. d) F(x,y,z) = x'y'z + x'yz' + xy'z' + x'y'z'. These are the sum-of-products expansions of the Boolean function F(x, y, z) for the given conditions.
a) When x = 0, F(x,y,z) equals 1 if and only if yz = 0. This can be expressed as the sum of products: F(x,y,z) = y'z' (read as "not y and not z").
b) When xy = 0, F(x,y,z) equals 1 if and only if either x = 0 or y = 0. This can be expressed as the sum of products: F(x,y,z) = x'y'z' + x'y'z + xy'z' (read as "not x and not y and not z" OR "not x and not y and z" OR "x and not y and not z").
c) When x + y = 0, F(x,y,z) equals 1 if and only if x = y = 0. This can be expressed as the sum of products: F(x,y,z) = x'y'z' (read as "not x and not y and not z").
d) When xyz = 0, F(x,y,z) equals 1 if and only if x = 0 or y = 0 or z = 0. This can be expressed as the sum of products: F(x,y,z) = x'y'z + x'yz' + xy'z' + x'y'z' (read as "not x and not y and z" OR "not x and y and not z" OR "x and not y and not z" OR "not x and not y and not z").
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find the value of the derivative (if it exists) at
each indicated extremum.
Answer:
The value of the derivative at (0, 0) is zero.
Step-by-step explanation:
Given function:
[tex]f(x)=\dfrac{x^2}{x^2+4}[/tex]
To differentiate the given function, use the quotient rule and the power rule of differentiation.
[tex]\boxed{\begin{minipage}{5.4 cm}\underline{Quotient Rule of Differentiation}\\\\If $y=\dfrac{u}{v}$ then:\\\\$\dfrac{\text{d}y}{\text{d}x}=\dfrac{v \dfrac{\text{d}u}{\text{d}x}-u\dfrac{\text{d}v}{\text{d}x}}{v^2}$\\\end{minipage}}[/tex]
[tex]\boxed{\begin{minipage}{5.4 cm}\underline{Power Rule of Differentiation}\\\\If $y=x^n$, then $\dfrac{\text{d}y}{\text{d}x}=nx^{n-1}$\\\end{minipage}}[/tex]
[tex]\boxed{\begin{minipage}{5.4cm}\underline{Differentiating a constant}\\\\If $y=a$, then $\dfrac{\text{d}y}{\text{d}x}=0$\\\end{minipage}}[/tex]
[tex]\begin{aligned}\textsf{Let}\;u &= x^2& \implies \dfrac{\text{d}u}{\text{d}{x}} &=2 \cdot x^{(2-1)}=2x\\\\\textsf{Let}\;v &=x^2+4& \implies \dfrac{\text{d}v}{\text{d}{x}} &=2 \cdot x^{(2-1)}+0=2x\end{aligned}[/tex]
Apply the quotient rule:
[tex]\implies f'(x)=\dfrac{v \dfrac{\text{d}u}{\text{d}x}-u\dfrac{\text{d}v}{\text{d}x}}{v^2}[/tex]
[tex]\implies f'(x)=\dfrac{(x^2+4) \cdot 2x-x^2 \cdot 2x}{(x^2+4)^2}[/tex]
[tex]\implies f'(x)=\dfrac{2x(x^2+4)-2x^3}{(x^2+4)^2}[/tex]
[tex]\implies f'(x)=\dfrac{2x^3+8x-2x^3}{(x^2+4)^2}[/tex]
[tex]\implies f'(x)=\dfrac{8x}{(x^2+4)^2}[/tex]
An extremum is a point where a function has a maximum or minimum value. From inspection of the given graph, the minimum point of the function is (0, 0).
To determine the value of the derivative at the minimum point, substitute x = 0 into the differentiated function.
[tex]\begin{aligned}\implies f'(0)&=\dfrac{8(0)}{((0)^2+4)^2}\\\\&=\dfrac{0}{(0+4)^2}\\\\&=\dfrac{0}{(4)^2}\\\\&=\dfrac{0}{16}\\\\&=0 \end{aligned}[/tex]
Therefore, the value of the derivative at (0, 0) is zero.
(b) Write 5 as a percentage.
Answer:
5 as a percentage of 100 is 5/100 which is 5%
any point on the parabola can be labeled (x,y), as shown. a parabola goes through (negative 3, 3)
The correct standard form of the equation of the parabola is:
[tex]y = -x^2 - 1[/tex].
To find the standard form of the equation of the parabola that passes through the given points (-3, 3) and (1, -1), we can use the general form of the equation of a parabola:
[tex]y = ax^2 + bx + c[/tex] ___________(1)
Substituting the coordinates of the two given points into this equation, we get a system of two equations in three unknowns (a, b, and c):
[tex]3 = 9a - 3b + c[/tex]
[tex]-1 = a + b + c[/tex]
To solve for a, b, and c, we can eliminate one of the variables using subtraction or addition. Subtracting the second equation from the first, we get:
[tex]4 = 8a - 4b[/tex]
Simplifying this equation, we get:
[tex]2 = 4a - 2b[/tex]
Dividing both sides by 2, we get:
[tex]1 = 2a - b[/tex]___________(2)
Now we can substitute this expression for b into one of the earlier equations to eliminate b. Using the first equation, we get:
[tex]3 = 9a - 3(2a - 1) + c[/tex]
Simplifying this equation, we get:
[tex]3 = 6a + c + 3[/tex]
Subtracting 3 from both sides, we get:
[tex]0 = 6a + c[/tex]
Solving for c, we get:
c = -6a __________(3)
Substituting this expression for c into the second equation, we get:
[tex]-1 = a + (2a - 1) - 6a[/tex]
Simplifying this equation, we get:
[tex]-1 = -3a - 1[/tex]
Adding 1 to both sides, we get:
[tex]-3a =0[/tex]
Solving for a, we get:
[tex]a = 0[/tex]
Substituting this value of a into the equation(3) for c, we get:
c = 0
Substituting a = 0 into the equation(2) for b that we found earlier, we get:
[tex]1 = 0 - b[/tex]
Solving for b, we get:
[tex]b = -1[/tex]
Putting the values of a, b and c in (1), we get
[tex]y = -x^2 - 1[/tex]
Therefore, the equation of the parabola that passes through the given points (-3, 3) and (1, -1) is:
[tex]y = -x^2 - 1[/tex]
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Complete question:
A parabola goes through (-3, 3) & (1, -1). A point is below the parabola at (-3, 2). A line above the parabola goes through (-3, 4) & (0, 4). A point on the parabola is labeled (x, y).
What is the correct standard form of the equation of the parabola?
The figure is in the image attached below
Question 9 (2 points)
A survey asked 1,000 people if they invested in Stocks or Bonds for retirement. 700
said they invested in stocks, 400 said bonds, and 300 said both.
How many invested in neither stocks nor bonds?
Note: consider making a Venn Diagram to help solve this problem.
0
200
400
100
200 people invested in neither stocks nor bonds for retirement.
What is inclusion-exclusion principle?The inclusion-exclusion principle is a counting method used to determine the size of a set created by joining two or more sets. It is predicated on the notion that if we just sum the set sizes, we can wind up counting certain components more than once (the elements that are in the intersection of the sets). We deduct the sizes of the sets' intersections from the sum of their sizes to prevent double counting.
The total number of people who invested in stocks are:
Total = Stocks + Bonds - Both
Total = 700 + 400 - 300
Total = 800
Using the inclusion- exclusion principle:
neither = Total surveyed - Total
neither = 1000 - 800 = 200
Hence, 200 people invested in neither stocks nor bonds for retirement.
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Maximize z = 3x₁ + 5x₂
subject to: x₁ - 5x₂ ≤ 35
3x1 - 4x₂ ≤21
with. X₁ ≥ 0, X₂ ≥ 0.
use simplex method to solve it and find the maximum value
Answer:
See below.
Step-by-step explanation:
We can solve this linear programming problem using the simplex method. We will start by converting the problem into standard form
Maximize z = 3x₁ + 5x₂ + 0s₁ + 0s₂
subject to
x₁ - 5x₂ + s₁ = 35
3x₁ - 4x₂ + s₂ = 21
x₁, x₂, s₁, s₂ ≥ 0
Next, we create the initial tableau
Basis x₁ x₂ s₁ s₂ RHS
s₁ 1 -5 1 0 35
s₂ 3 -4 0 1 21
z -3 -5 0 0 0
We can see that the initial basic variables are s₁ and s₂. We will use the simplex method to find the optimal solution.
Step 1: Choose the most negative coefficient in the bottom row as the pivot element. In this case, it is -5 in the x₂ column.
Basis x₁ x₂ s₁ s₂ RHS
s₁ 1 -5 1 0 35
s₂ 3 -4 0 1 21
z -3 -5 0 0 0
Step 2: Find the row in which the pivot element creates a positive quotient when each element in that row is divided by the pivot element. In this case, we need to find the minimum positive quotient of (35/5) and (21/4). The minimum is (21/4), so we use the second row as the pivot row.
Basis x₁ x₂ s₁ s₂ RHS
s₁ 4/5 0 1/5 1 28/5
x₂ -3/4 1 0 -1/4 -21/4
z 39/4 0 15/4 3/4 105
Step 3: Use row operations to create zeros in the x₂ column.
Basis x₁ x₂ s₁ s₂ RHS
s₁ 1 0 1/4 7/20 49/10
x₂ 0 1 3/16 -1/16 -21/16
z 0 0 39/4 21/4 525/4
The optimal solution is x₁ = 49/10, x₂ = 21/16, and z = 525/4.
Therefore, the maximum value of z is 525/4, which occurs when x₁ = 49/10 and x₂ = 21/16.
Help please! I have no idea!!!! PLEASEEE
The the inverse of [tex]n = \frac{3t+8}{5}$[/tex] is [tex]t = \frac{5n-8}{3}$[/tex].
How to find inverse of the function?To find the inverse of [tex]n = \frac{3t+8}{5}$[/tex], we need to solve for t in terms of n.
Starting with the given equation, we can first multiply both sides by 5 to get rid of the fraction:
[tex]$$5n = 3t + 8$$[/tex]
Next, we can isolate t by subtracting 8 from both sides and then dividing by 3:
[tex]$\begin{align*}5n - 8 &= 3t \\frac{5n-8}{3} &= t\end{align*}[/tex]
Therefore, the inverse of n is:
[tex]$t = \frac{5n-8}{3}$$[/tex]
We can also check that this is indeed the inverse by verifying that:
[tex]$n = \frac{3t+8}{5} = \frac{3}{5} \cdot \frac{5n-8}{3} + \frac{8}{5} = n$$[/tex]
So, the inverse of [tex]n = \frac{3t+8}{5}$[/tex] is [tex]t = \frac{5n-8}{3}$[/tex].
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Find x, if √x +2y^2 = 15 and √4x - 4y^2=6
pls help very soon
Answer:
We have two equations:
√x +2y^2 = 15 ----(1)
√4x - 4y^2=6 ----(2)
Let's solve for x:
From (1), we have:
√x = 15 - 2y^2
Squaring both sides, we get:
x = (15 - 2y^2)^2
Expanding, we get:
x = 225 - 60y^2 + 4y^4
From (2), we have:
√4x = 6 + 4y^2
Squaring both sides, we get:
4x = (6 + 4y^2)^2
Expanding, we get:
4x = 36 + 48y^2 + 16y^4
Substituting the expression for x from equation (1), we get:
4(225 - 60y^2 + 4y^4) = 36 + 48y^2 + 16y^4
Simplifying, we get:
900 - 240y^2 + 16y^4 = 9 + 12y^2 + 4y^4
Rearranging, we get:
12y^2 - 12y^4 = 891
Dividing both sides by 12y^2, we get:
1 - y^2 = 74.25/(y^2)
Multiplying both sides by y^2, we get:
y^2 - y^4 = 74.25
Let z = y^2. Substituting, we get:
z - z^2 = 74.25
Rearranging, we get:
z^2 - z + 74.25 = 0
Using the quadratic formula, we get:
z = (1 ± √(1 - 4(1)(74.25))) / 2
z = (1 ± √(-295)) / 2
Since the square root of a negative number is not real, there are no real solutions for z, which means there are no real solutions for y and x.
Therefore, the answer is "no solution".
What is the equation of the line graphed?
The equation of given line which is graphed is [tex]x+2=0.[/tex] By locating the slope (m) and y-intercept (b) in the graph of a line, we can define a linear function in the form y=mx+b.
What is the formula for a line on a line graph?A straight line's graph equation can be expressed as [tex]y = m x + c[/tex] , which consists of a term, a term, and a number. a new. to the a and the likes in the likes thes of the likes of thes of thes of thes of thes of thes of people.
A line graph is a type of graph that uses straight lines to connect the data points. A line graph can show how something changes over time or compares different situations1.
A horizontal line has the equation \(y = c\), where \(c\) is a constant. This means that the \(y\)-value of every point on the line is the same
Therefore, The set of all points (x,y) in the plane that satisfy the equation [tex]y=f(x) y = f (x)[/tex] is the function's graph.
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Last week, the price of bananas at a grocery store was $1.40 per pound. This week, bananas at the
same grocery store are on a sale at a 10% discount. What is the total price of 6 pounds of bananas this
week at the grocery store?
A. $8.19
B. $9.18
C. $9.10
D. $8.40
According to one meaning of the phrase, it merely refers to the selling price of something. For instance, a piece of art would be sold for that amount if bids reached a record high of $10 million. Thus, option A is correct
What is the sale price by the number of pounds?The sale price of bananas this week is 10% off the original price of $1.40 per pound, which means the sale price is:
$1.40 - 10% of $1.40 = $1.26 per pound
To find the total cost of 6 pounds of bananas this week, we can multiply the sale price by the number of pounds:
$1.26 per pound * 6 pounds = $ [tex]7.56[/tex]
Therefore, the total price of 6 pounds of bananas this week at the grocery store is $ [tex]7.56[/tex] .
However, we need to be careful with the answer choices provided. They all differ from $7.56, so we need to double-check our calculations.
If we add a 10% discount to $1.40 per pound, we get:
$1.40 - (10/100)*$1.40 = $1.26 per pound
And the total cost of 6 pounds at $1.26 per pound is:
$ [tex]1.26 \times 6[/tex] = $ [tex]7.56[/tex]
Therefore, $ [tex]8.19[/tex] is not a possible answer, and the other options are either miscalculated or rounded incorrectly.
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Traffic signs are regulated by the Manual on Uniform Traffic Control Devices (MUTCD). The perimeter of a rectangular traffic sign is 126 inches. Also, its length is 9 inches longer than its widthFind the dimensions of this sign.
Answer:
Traffic signs are regulated by the Manual on Uniform Traffic Control Devices (MUTCD). The perimeter of a rectangular traffic sign is 126 inches. Also, its length is 9 inches longer than its widthFind the dimensions of this sign.
Step-by-step explanation:
Let's say the width of the sign is x inches. Then, according to the problem, the length of the sign is 9 inches longer than the width, which means the length is x + 9 inches.
The perimeter of a rectangle can be found by adding up the length of all its sides. For this sign, the perimeter is given as 126 inches. So we can set up an equation:
2(length + width) = 126
Substituting the expressions for length and width in terms of x, we get:
2(x + x + 9) = 126
Simplifying and solving for x:
2(2x + 9) = 126
4x + 18 = 126
4x = 108
x = 27
So the width of the sign is 27 inches, and the length is 9 inches longer, or 36 inches. Therefore, the dimensions of the sign are 27 inches by 36 inches.
Can someone help quick i have 6 questions left
Answer:
Step-by-step explanation:
long leg = 78 (means that 26√3*√3 = 26√9 = 26*3 = 78
for x: Short leg= 26√3
Hypotenuse= 2*26√3 = 52√3 for y
for autonomous equations, find the equilibria, sketch a phase portrait, state the stability of the equilibria.
Understanding the equilibria, sketching a phase portrait, and determining the stability of equilibria for autonomous equations are important tools for analyzing and understanding the behavior of systems over time.
Autonomous equations are differential equations that do not depend explicitly on time. To find the equilibria of an autonomous equation, we set the derivative of the function to zero and solve for the values of the independent variable that satisfy the equation. These values represent points at which the function does not change over time and are known as equilibrium points.
To sketch a phase portrait for an autonomous equation, we plot the slope field of the function and then draw solutions through each equilibrium point. The resulting graph shows the behavior of the function over time and helps us understand how the solutions behave near each equilibrium point.
The stability of an equilibrium point is determined by examining the behavior of nearby solutions. If nearby solutions move toward the equilibrium point over time, the equilibrium point is stable. If nearby solutions move away from the equilibrium point over time, the equilibrium point is unstable. Finally, if the behavior of nearby solutions is inconclusive, further analysis is needed.
Here is the sketch for [tex]dx/dt = x - x^3[/tex]
/ <--- (-∞) x=-1 (+∞) ---> \
/ \
<--0--> x=-1 x=1 0-->
\ /
\ <--- (-∞) x=1 (+∞) ---> /
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please help me with math i’ll give you brainlist
Answer: False
Step-by-step explanation:
25% of the data is between Q1 and the median.
30 POINTS! PLEASEHELP
Answer:
Required length is 13 feet
Step-by-step explanation:
[tex]{ \rm{length = \sqrt{ {12}^{2} + {5}^{2} } }} \\ \\ { \rm{length = \sqrt{144 + 25} }} \\ \\ { \rm{length = \sqrt{169} }} \\ \\ { \rm{length = 13 \: feet}}[/tex]
0.0125 inches thick
Question 4
1 pts
The combined weight of a spool and the wire it carries is 13.6 lb. If the weight of the spool is 1.75 lb.,
what is the weight of the wire?
Question 5
1 pts
In linear equation, 11.85 pounds is the weight of the wire.
What is linear equation?
A linear equation is a first-order (linear) term plus a constant in the algebraic form y=mx+b, where m is the slope and b is the y-intercept. The variables in the previous sentence, y and x, are referred to as a "linear equation with two variables" at times.
Total weight of pool having 16 wires =13.6 pounds
Weight of the pool =1.75
Therefore the weight of the wire alone = 13.6 - 1.75
= 11.85 pounds
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Dividing sin^2Ø+cos^2Ø=1 by ____ yields 1+cot^2Ø=csc^2Ø
a.cot^2Ø
b.tan^2Ø
c.cos^2Ø
d.csc^2Ø
e.sec^2Ø
f.sin^2Ø
To obtain the required equation we divide the equation by sin²Ø.
What are trigonometric functions?The first six functions are trigonometric, with the domain value being the angle of a right triangle and the range being a number. The angle, expressed in degrees or radians, serves as the domain and the range of the trigonometric function (sometimes known as the "trig function") of f(x) = sin. Like with all other functions, we have the domain and range. In calculus, geometry, and algebra, trigonometric functions are often utilised.
The given equation is:
sin²Ø+cos²Ø=1
To obtain the required equation we divide the equation with sin²Ø:
sin²Ø/sin²Ø +cos²Ø/ sin²Ø = 1/sin²Ø
1 + cot²Ø = csc²Ø
Hence, to obtain the required equation we divide the equation by sin²Ø.
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what is the number of real solutions
-X^2-9=6x
Answer options
1. Cannot be determined
2. No real solutions
3. One solution
4. two solutions
Answer:
3. One solution
Step-by-step explanation:
-x²-9 = 6x
or, x²+6x+9 = 0
or, x²+2.x.3+3² = 0 [using (a+b)² = a²+2ab+b²]
or, (x+3)² = 0
or, x+3 = 0
x = -3
The lunch special at Maria's Restaurant is a sandwich and a drink. There are 2 sandwiches and 5 drinks to choose from. How many lunch specials are possible?
Answer:
the question is incomplete, so I looked for similar questions:
There are 3 sandwiches, 4 drinks, and 2 desserts to choose from.
the answer = 3 x 4 x 2 = 24 possible combinations
Explanation:
for every sandwich that we choose, we have 4 options of drinks and 2 options of desserts = 1 x 4 x 2 = 8 different options per type of sandwich
since there are 3 types of sandwiches, the total options for lunch specials = 8 x 3 = 24
If the numbers are different, all we need to do is multiply them. E.g. if instead of 3 sandwiches there were 5 and 3 desserts instead of 2, the total combinations = 5 x 4 x 3 = 60.
For this question's answer, there are 2 x 5 = 10 lunch specials are possible.
The number of lunch specials possible are 10.
How many ways k things out of m different things (m ≥ k) can be chosen if order of the chosen things doesn't matter?We can use combinations for this case,
Total number of distinguishable things is m.
Out of those m things, k things are to be chosen such that their order doesn't matter.
This can be done in total of
[tex]^mC_k = \dfrac{m!}{k! \times (m-k)!} ways.[/tex]
If the order matters, then each of those choice of k distinct items would be permuted k! times.
So, total number of choices in that case would be:
[tex]^mP_k = k! \times ^mC_k = k! \times \dfrac{m!}{k! \times (m-k)!} = \dfrac{m!}{ (m-k)!}\\\\^mP_k = \dfrac{m!}{ (m-k)!}[/tex]
This is called permutation of k items chosen out of m items (all distinct).
We are given that;
Number of sandwiches=2
Number of drinks=5
Now,
To find the total number of lunch specials, we need to multiply the number of choices for sandwiches by the number of choices for drinks.
Number of sandwich choices = 2
Number of drink choices = 5
Total number of lunch specials = 2 x 5 = 10
Therefore, by combinations and permutations there are 10 possible lunch specials.
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The Butler family and the Phillips family each used their sprinklers last summer. The water output rate for the Butler family's sprinkler was 25 L per hour. The water output rate for the Phillips family's sprinkler was 40 L per hour. The families used their sprinklers for a combined total of 55 hours, resulting in a total water output of 1750 L. How long was each sprinkler used?
The Butler family used their sprinkler for 30 hours and the Phillips family used their sprinkler for 25 hours.
Let's solve the problem with algebra.
Let x represent the number of hours the Butlers used their sprinkler, and y represent the number of hours the Phillips family used their sprinkler. We are aware of the following:
The Butler family's sprinkler had a water output rate of 25 L per hour, so the total amount of water they used is 25x.
The Phillips family's sprinkler had a water output rate of 40 L per hour, so the total amount of water they used was 40y.
The sprinklers were used by the families for a total of 55 hours, so x + y = 55.
The total amount of water produced was 1750 L, so 25x + 40y = 1750.
Using these equations, we can now solve for x and y.
First, we can solve for one of the variables in terms of the other using the equation x + y = 55. For instance, we can solve for x as follows:
x = 55 - y
When we plug this into the second equation, we get:
25(55 - y) + 40y = 1750
We get the following results when we expand and simplify:
1375 - 25y + 40y = 1750
15y = 375
y = 25
As a result, the Phillips family ran their sprinkler for 25 hours. We get the following when we plug this into the equation x + y = 55:
x + 25 = 55
x = 30
As a result, the Butlers used their sprinkler for 30 hours.
As a result, the Butler family sprinkled for 30 hours and the Phillips family sprinkled for 25 hours.
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Question 15 (2 points)
A standard deck of cards contains 4 suits of the same 13 cards. The contents of a
standard deck are shown below:
Standard deck of 52 cards
4 suits (CLUBS SPADES, HEARTS, DIAMONDS)
13 CLUBS
13 SPADES
13 HEARTS
DIAMONDS
If a card is drawn at random from the deck, what is the probability it is a jack or ten?
0
4/52- 1/13
8/52 = 2/13
48/52- 12/13
Answer: 2/13
Step-by-step explanation:
There are four jacks and four tens in a standard deck of 52 cards. However, the jack of spades and the ten of spades are counted twice since they are both a jack and a ten. Therefore, there are 8 cards that are either a jack or a ten, and the probability of drawing one of these cards at random is:
P(Jack or Ten) = 8/52 = 2/13
So the answer is 2/13.
Step-by-step explanation:
a probability is airways the ratio
desired cases / totally possible cases
in each of the 4 suits there is one Jack and one 10.
that means in the whole deck of cards we have
4×2 = 8 desired cases.
the totally possible cases are the whole deck = 52.
so, the probability to draw a Jack or a Ten is
8/52 = 2/13
1. Ferris Wheel Problem As you ride the Ferris wheel, your distance from the
ground varies sinusoidally with time. When the last seat1 is filled and the Ferris
wheel starts, your seat is at the position shown in the figure below. Lett be the
number of seconds that have elapsed since the Ferris wheel started. You find that
it takes you 3 seconds to reach the top, 43 feet above ground, and that the wheel
makes a
a. Sketch a graph of this sinusoidal function.
b. What is the lowest you go as the Ferris
wheel turns?
c. Find an equation of this sinusoid.
d. Predict your height above ground when
you have been riding for 4 seconds.
e. Using Desmos, find the first three times you are 18
feet above ground.
Seat
QI
Rotation
Ground
The graph of this sinusoidal function can be drawn as shown in the diagram below. As the Ferris wheel rotates, the position of the seat varies sinusoidally with respect to time.
What is graph?Graph is a type of diagram used to represent information using a network of points and lines that connect them. It is a powerful data visualization tool that can help to effectively convey information and make relationships between data sets easier to understand. Graphs can be used to represent a wide variety of data types such as numerical, categorical or time-series data. Graphs are commonly used in mathematics, physics, biology, engineering, economics, and other disciplines.
b. The lowest point the seat reaches is 0 feet above ground, as the Ferris wheel makes a full rotation.
c. An equation of this sinusoid can be written as y = A sin (Bt + C), where A is the amplitude, B is the angular frequency, t is time, and C is the phase shift.
d. When you have been riding for 4 seconds, your height above ground is 43 feet.
e. Using Desmos, the first three times your height is 18 feet above ground can be found by solving the equation y = 18. The solutions are t = 0.715 seconds, t = 4.715 seconds, and t = 8.715 seconds.
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find the following answer
Cardinality of given set is 10.
Describe Cardinality.The cardinality of a mathematical set refers to the number of entries in the set. It may be limited or limitless. For instance, if set A has six items, its cardinality is equivalent to 6: 1, 2, 3, 4, 5, and 6. A set's size is often referred to as the set's cardinality. The modulus sign is used to indicate it on either side of the set name, |A|.
a Set's CardinalityA set that can be counted and has a finite number of items is said to be finite. On the other hand, an infinite set is one that has an unlimited number of components and can either be countable or uncountable.
Possible set of A=14+4+1+9=28
Possible set of C=1 +6+9+9=25
n(A∩ C)=10
Hence, Cardinality of given set is 10.
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The Khan Shatyr Entertainment Center in Kazakhstan is the largest tent in the world. The spire on top is 60 m in length. The distance from the center of the tent to the outer edge is 97.5 m. The angle between the ground and the side of the tent is 42.7°.
Find the total height of the tent (h), including the spire.
Find the length of the side of the tent (x)
i. The total height of the tent including the spire is 150 m.
ii. The length of the side of the tent x is 132.7 m.
What is a trigonometric function?Trigonometric functions are required functions in determining either the unknown angle of length of the sides of a triangle.
Considering the given question, we have;
a. To determine the total height of the tent, let its height from the ground to the top of the tent be represented by x. Then:
Tan θ = opposite/ adjacent
Tan 42.7 = h/ 97.5
h = 0.9228*97.5
= 89.97
h = 90 m
The total height of the tent including the spire = 90 + 60
= 150 m
b. To determine the length of the side of the tent x, we have:
Cos θ = adjacent/ hypotenuse
Cos 42.7 = 97.5/ x
x = 97.5/ 0.7349
= 132.67
The length of the side of the tent x is 132.7 m.
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Let sinθ= 2√2/5 and π/2 < θ < π Part A: Determine the exact value of cos 2θ. Part B: Determine the exact value of sin (θ/2)
Answer:
Part A: To determine the exact value of cos 2θ, we can use the double-angle identity for cosine:
cos 2θ = 2 cos^2 θ - 1
We already know sin θ, so we can use the Pythagorean identity to find cos θ:
cos^2 θ = 1 - sin^2 θ
cos^2 θ = 1 - (2√2/5)^2
cos^2 θ = 1 - 8/25
cos^2 θ = 17/25
cos θ = ± √(17/25)
cos θ = ± (1/5) √17
Since θ is in the third quadrant (π/2 < θ < π), cos θ is negative, so we take the negative root:
cos θ = -(1/5) √17
Substituting into the double-angle identity:
cos 2θ = 2 cos^2 θ - 1
cos 2θ = 2 [-(1/5) √17]^2 - 1
cos 2θ = 2 (1/25) (17) - 1
cos 2θ = 34/25 - 1
cos 2θ = 9/25
Therefore, the exact value of cos 2θ is 9/25.
Part B: To determine the exact value of sin (θ/2), we can use the half-angle identity for sine:
sin (θ/2) = ± √[(1 - cos θ)/2]
We already know cos θ, so we can substitute it in:
cos θ = -(1/5) √17
sin (θ/2) = ± √[(1 - cos θ)/2]
sin (θ/2) = ± √[(1 - (-1/5) √17)/2]
sin (θ/2) = ± √[(5 + √17)/10]
sin (θ/2) = ± (1/2) √(5 + √17)
Since θ is in the third quadrant (π/2 < θ < π), sin θ is negative, so we take the negative root:
sin (θ/2) = -(1/2) √(5 + √17)
Therefore, the exact value of sin (θ/2) is -(1/2) √(5 + √17).
The exact values of the sine and cosine given are -(1/2) √(5 + √17) and 9/25.
What is the sine and the cosine of an angle?The sine of an angle in a right triangle is the ratio of the hypotenuse to the side opposite the angle.
The cosine of an angle in a right triangle is the ratio of the hypotenuse to the side adjacent the angle.
Part A: To determine the exact value of cos 2θ, we can use the double-angle identity for cosine:
cos 2θ = 2 cos² θ - 1
Using the Pythagorean identity to find cos θ:
cos² θ = 1 - sin² θ
cos² θ = 1 - (2√2/5)²
cos² θ = 1 - 8/25
cos² θ = 17/25
cos θ = ± √(17/25)
cos θ = ± (1/5) √17
Since θ is in the third quadrant (π/2 < θ < π), cos θ is negative, so we take the negative root:
cos θ = -(1/5) √17
Substituting into the double-angle identity:
cos 2θ = 2 cos² θ - 1
cos 2θ = 2 [-(1/5) √17]² - 1
cos 2θ = 2 (1/25) (17) - 1
cos 2θ = 34/25 - 1
cos 2θ = 9/25
Therefore, the exact value of cos 2θ is 9/25.
Part B: To determine the exact value of sin (θ/2), we can use the half-angle identity for sine:
sin (θ/2) = ± √[(1 - cos θ)/2]
We already know cos θ, so we can substitute it in:
cos θ = -(1/5) √17
sin (θ/2) = ± √[(1 - cos θ)/2]
sin (θ/2) = ± √[(1 - (-1/5) √17)/2]
sin (θ/2) = ± √[(5 + √17)/10]
sin (θ/2) = ± (1/2) √(5 + √17)
Since θ is in the third quadrant (π/2 < θ < π), sin θ is negative, so we take the negative root:
sin (θ/2) = -(1/2) √(5 + √17)
Therefore, the exact value of sin (θ/2) is -(1/2) √(5 + √17).
Hence, the exact values of the sine and cosine given are -(1/2) √(5 + √17) and 9/25.
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