The cube root of both sides to solve for x variable is
x = (k - y^3 - z^3)^(1/3)
You can solve for y or z in terms of the other variables by rearranging the original equation.
Given the equation: x^3 + y^3 + z^3 = k.
To solve this equation for one of the variables (x, y, or z), you would need additional information or constraints. However, I can provide you with a general method to express one variable in terms of the others. Let's solve for x:
Step 1: Subtract y^3 and z^3 from both sides of the equation.
x^3 = k - y^3 - z^3
Step 2: Take the cube root of both sides to solve for x.
x = (k - y^3 - z^3)^(1/3)
Now, x is expressed in terms of y, z, and k. If you have any specific values for y, z, and k, you can substitute them into this equation to find the corresponding value of x. Similarly, you can solve for y or z in terms of the other variables by rearranging the original equation.
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Directions: Solve the following. Show your solution.
1. Diane has clay in a can. Its radius is 6 cm while its height is 10 cm. She wanted to transfer some of her clay to her cone-shaped container. What is the volume of the cone to be filled up if it has the same radius and height with
Pls do it with a solution
the volume of the cone to be filled up if it has the same radius and height with is 376. 6 cm³
How to determine the volumeTo determine the volume, we need to know the formula for the volume of a cone.
The formula for the volume of a cone is expressed as;
V = πr²h/3
Such that the parameters are expressed as;
V is the volume of the coner is the radius of the coneh is the height of the coneSubstitute the values, we have;
Volume = 3.14 × 6² × 10/3
Find the square value
Multiply the value, we have;
Volume = 1130. 4/3
Divide the values
Volume = 376. 6 cm³
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Find the average value of f(x) = √81 -x² over the interval [0, 9].
Answer:
[tex]f_{ave}=\dfrac{9\pi}{4}[/tex]
Step-by-step explanation:
You want the average value of f(x) = √(81 -x²) on the interval [0, 9].
AreaThe function f(x) defines a quarter circle of radius 9 in the first quadrant on the given interval. Its area is given by the formula in the problem statement:
A = (1/4)πr² = (π/4)·81
Average valueThe average value of the function is the area divided by the width of the interval:
[tex]f_{ave}=\dfrac{\dfrac{81\pi}{4}}{9}\\\\\\\boxed{f_{ave}=\dfrac{9\pi}{4}}[/tex]
__
Additional comment
You will notice that the average value is π/4 times the radius. This is also true for a semicircle. The attachment shows the rectangle with area equal to that of the quarter circle.
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For which equations is 8 a solution? Select the four correct answers. x + 6 = 2 x + 2 = 10 x minus 4 = 4 x minus 2 = 10 2 x = 4 3 x = 24 StartFraction x Over 2 EndFraction = 16 StartFraction x Over 8 EndFraction = 1
ASAP ASAP ASAP ASAP.
The equations has 8 a solution are
x/2 = 16
x/8 = 1
x/2 = 8
x/8 = 1
To check whether 8 is a solution for an equation, we substitute x = 8 into the equation and see if it satisfies the equation. If it does, then 8 is a solution; otherwise, it is not.
Substituting x = 8 into each equation, we get:
1. x + 6 = 8 + 6 = 14 (8 is not a solution)
2. 2x + 2 = 2(8) + 2 = 18 (8 is not a solution)
3. 4x - 2 = 4(8) - 2 = 30 (8 is not a solution)
4. 10 = 10 (8 is not a solution)
5. 2x = 4 (8 is not a solution)
6. 3x = 24 (8 is not a solution)
7. 8/2 = 4 (8 is a solution)
83 8/8 = 1 (8 is a solution)
Therefore, the correct answers are:
x/2 = 16
x/8 = 1
x/2 = 8
x/8 = 1
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Find the value of x.
69°
138°
X
x = 0
Answer:
x = 106
Step-by-step explanation:
You want the measure of the unknown angle (x°) in the quadrilateral with angles 47°, 138°, and 69° given.
Angle sumThe sum of angles in a quadrilateral is 360°, so the measure of x is ...
x = 360 -47 -138 -69 = 106
Angle x° is 106°.
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5x + 7 =-13 what is x
Answer:
-4
Step-by-step explanation:
5x=-13-7
5x=-20
x=-20/5
x=-4
Answer:
5x+7=-13
5x=-13-7
5x=-20
x=-20 divide by 5
x=-4
3.
-2x=-2
Carly deposits money into a compound interest account in 2010. The equation P = 600(1.0375)
represents the amount of money in her account, P, after t years.
Determine how much money Carly has in her account in 2047. What was the growth rate?
How long does it take for Carly's account to reach $750? Round answer to the nearest tenth.
Carly has $2342.67 in her account in 2047.
Growth rate of the account is 3.75% per year.
How much money does Carly in 2047?To get amount of money Carly has in her account in 2047, we need to substitute t = 2047 into equation [tex]P = 600(1.0375)^t.[/tex]
Years = 2047 - 2010
Years = 37
[tex]P = 600*(1.0375)^{37}\\P = 600*(3.90445030158)\\P = 2342.67018095\\P = $2342.67[/tex]
The growth rate is calculated by finding the exponent coefficient in the equation [tex]P = 600(1.0375)^t[/tex]
Growth rate = (1.0375 - 1) × 100
Growth rate = 0.0375 × 100
Growth rate = 3.75%
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Find the circumference of the circle. Use pie= 3.14.
Answer:
C. 62.8 mi
Step-by-step explanation:
Formulas to know:
[tex]c = \pi d[/tex]
[tex]c=2\pi r[/tex]
For this problem use c = [tex]\pi[/tex]d
[tex]c =\pi d[/tex]
[tex]c = 3.14*20[/tex]
[tex]c = 62.8[/tex]
In ΔGHI, g = 240 cm, m m∠H=157° and m m∠I=17°. Find the length of h, to the nearest 10th of a centimeter.
Check the picture below.
[tex]\textit{Law of Sines} \\\\ \cfrac{a}{\sin(\measuredangle A)}=\cfrac{b}{\sin(\measuredangle B)}=\cfrac{c}{\sin(\measuredangle C)} \\\\[-0.35em] ~\dotfill\\\\ \cfrac{h}{\sin(157^o)}=\cfrac{240}{\sin(6^o)}\implies h\sin(6^o)=240\sin(157^o) \\\\\\ h=\cfrac{240\sin(157^o)}{\sin(6^o)}\implies h\approx 897.1~cm[/tex]
Make sure your calculator is in Degree mode.
PLS HELP 15 POINTS I'LL DO BRAINLIEST
URGENT
What is the name of the figure?
A rectangular pyramid.
Group of answer choices
triangular prism
rectangular pyramid
rectangular prism
triangular pyramid
Answer:
Triangular Pyramid
Step-by-step explanation:
It is triangular and looks like a pyramid. It also has a square base and four triangular faces, which is usual for a triangular pyramid.
(will give brainly if possible)
What is the area of the image of the rectangle under this transformation?
The area of the image of the rectangle under the transformation is 10 square units
Calculating the area of the image of the rectangle under the transformation?From the question, we have the following parameters that can be used in our computation:
Matrix transformation: [tex]\left[\begin{array}{cc}-7&-2\\6&12\end{array}\right][/tex]
And, we have rectangle plotted on the graph
The transformation is a rigid transformation
This means that the area of the rectangle would be the same before and after the transformation
From the graph, the side lengths of the rectangle are
Length = 2
Width = 5
So, we have
Area = 2 * 5
Evaluate
Area = 10
Hence, the area of the image of the rectangle under the transformation is 10 square units
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PLEASE HELP ME ANSWER THIS QUESTION. I REALLY NEED IT
GEOMRETY HELP ANY THING HELPS
(3) The linear equation is y = 1/3x + 1
(4) The solution to the system is (-1, -1/2)
(5) The factored expression of 45x² + 30x - 40 is 5(3x - 2)(3x + 4)
(6) The factored expression of 4x² - 36 is 4(x - 3)(x + 4)
(7) The surface area is 176
(8) The volume is 144
Solving the linear relationsFrom the graph, we have the following points
(0, 1) and (-3, 0)
A linear relation is represented as
y = mx + c
So, we have
y = mx + 1
Using the other point, we have
-3m + 1 = 0
m = 1/3
So, we have
y = 1/3x + 1
Next, we solve graphically
To do this, we plot the graphs and write out the point of intersection
In this case, the intersection point is (-1, -1/2)
So, the solution is (-1, -1/2)
Factoring the expressionsHere, we have
45x² + 30x - 40
When factored, we have
45x² + 30x - 40 = 5(3x - 2)(3x + 4)
Also, we have
4x² - 36
When factored, we have
4x² - 36 = 4(x - 3)(x + 4)
Calculating the surface areasFor figure (8), we have
Surface area = 2 *(9 * 4 + 4 * 4 + 9 * 4)
Evaluate
Surface area = 176
Also, we have
Volume = 9 * 4 * 4
Evaluate
Volume = 144
Hence, the surface area is 176 and the volume is 144
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Find all possible values of x.
The possible values of x in the circle using the theorem of intersecting secants are x = 7.38 and x = -11.38
Finding all possible values of x.From the question, we have the following parameters that can be used in our computation:
The intersecting secants
Using the theorem of intersecting secants, we have the following equation
(5 + 7) * 7 = (x + 4) * x
When the sum is evaluated, we have
12 * 7 = (x + 4) * x
When the product is evaluated, we have
84 = x² + 4x
So, we have
x² + 4x - 84 = 0
When solved for x, we get
x = 7.38 and x = -11.38
The value of x = -11.38 cannot be used
This is because x cannot be negative
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The approximate land areas of the seven continents are listed in the table below.
Continent Area (in sq. miles)
Africa
Antarctica
Asia
Australia
Europe
North America
South America
11.7 million
5.4 million
17.3 million
3.3 million
3.8 million
9.4 million
6.9 million
What is the approximate mean of the land areas of the seven continents?
O 8.3 million
O57.8 million
O9.6 million
31.5 million
Answer: 8.3
Step-by-step explanation: Add all the numbers together, 11.7+5.4+17.3+3.3+3.8+9.4+6.9 equals 57.8 BUT WAIT! We aren't done, we have to divide the answer by the sum of all answers, so since there are 7 numbers we are adding together, we divide by 7, so 57.8 divided by 7 equals 8.3 (which is rounded to the nearest tenth) and theres your asnwer. Hope this helps!
Round the answer for x^2 to 2 decimal places
b) The critical value is 11.34.
c) By Using a chi-squared distribution table with 100 degrees of freedom and a significance level of 0.005, the critical value is 137.18.
Now, WE can simplify as;
a) For conduct a chi-squared test for the fairness of a 6-sided die with a significance level of 0.05,
we have 5 degrees of freedom
Hence, By Using a chi-squared distribution table with 5 degrees of freedom and a significance level of 0.05, the critical value is 11.07.
And, When calculated chi-squared value exceeds 11.07, then the results are statistically significant at the given level.
b) Now, When examining the results of an experiment with 4 treatments and a significance level of 0.01, we have 3 degrees of freedom
Hence, By Using a chi-squared distribution table with 3 degrees of freedom and a significance level of 0.01, the critical value is 11.34.
And, When calculated chi-squared value exceeds 11.34, then the results are statistically significant at the given level.
c) Hence, For comparing outcomes in 101 different categories with a significance level of 0.005, we have 100 degrees of freedom.
So, By Using a chi-squared distribution table with 100 degrees of freedom and a significance level of 0.005, the critical value is 137.18.
And, When calculated chi-squared value exceeds 137.18, then the results are statistically significant at the given level.
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How tall is a building that casts a 68-ft shadow when the angle of elevation of the sun is 34 degrees?
The height of the building is approximately 45.44 ft when it casts a 68-ft shadow under an angle of elevation of 34 degrees.It's important to note that this calculation assumes the ground is flat and the sun's rays are parallel. Real-world conditions may introduce slight variations.
To determine the height of the building, we can use the trigonometric relationship involving the angle of elevation, the height of the building, and the length of its shadow.
Let's denote the height of the building as h. The length of the shadow cast by the building is given as 68 ft, and the angle of elevation of the sun is 34 degrees.
Using the tangent function, we have the equation:
tan(34°) = h / 68To
solve for h, we can rearrange the equation:
h = 68 * tan(34°)
Calculating this expression, we find:
h ≈ 68 * 0.668178 = 45.439344 ft.
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A: 10
B: 8
C: 21
D: 15
This stem and leaf diagram shows the number of students who go to various after school clubs. What is the smallest number of students who go to one of these clubs?
1| 6 8 9
2| 1
3| 5 9
4| 0 2 4 5
(Key: 2| 1 represents 21 students)
The smallest number of students who go to one of these clubs is 21.
A stem-and-leaf diagram is a quantitative assessment of a collection of data in which the data values are divided into a "stem" (the first digit of the number) and a "leaf" (the remainder of the number) (the last digit of the number).
Based on the given stem and leaf diagram, the smallest number of students who go to one of these clubs is represented by the leaf value "1" in the stem "2."
Therefore, the smallest number of students who go to one of these clubs is 21.
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What steps should be taken to calculate the volume of the prism? Select three options. A rectangular prism with a length of 9 and one-half feet, width of 24 feet, and height of 6 feet. Use the formula A = one-half b h to find the area of the base. Use the formula A = b h to find the area of the base. Use the formula V = B h to find the volume of the prism. The volume of the prism, V is (114) (6) = 684 feet cubed. The volume of the prism, V is (228) (6) = 1,368 feet cubed.
The volume of the prism is 1368 cubic feet.
We have,
The three steps that should be taken to calculate the volume of the prism are:
- Use the formula A = b h to find the area of the base, where b is the length of the base and h is the width of the base.
For a rectangular prism, the base is a rectangle, so the formula is:
A = length x width.
- Use the formula V = B h to find the volume of the prism, where B is the area of the base and h is the height of the prism.
For a rectangular prism, the formula.
V = length x width x height.
- Substitute the given values into the formulas and solve for the volume. For the given rectangular prism with a length of 9 and one-half feet, a width of 24 feet, and a height of 6 feet, we can find the volume by using the formula V = B h.
First, we find the area of the base by using the formula:
A = length x width:
A = (9.5 ft) x (24 ft)
= 228 sq ft
Next, we use the formula V = B h to find the volume:
V = (228 sq ft) x (6 ft)
= 1368 cubic feet
Therefore,
The volume of the prism is 1368 cubic feet.
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An artist plans to sell $250 of prints online each week. This week, she is within $25 of her goal.
Part A: Define a variable and write an absolute value equation to represent the scenario. (4 points)
Part B: Solve the equation, showing all steps. (4 points)
Part C: What are the minimum and maximum amounts that the artist received for her products? (2 points)
Answer:
Part A:
Let x be the amount the artist receives for her products this week. Then, the absolute value equation that represents the scenario is:
|250 - x| ≤ 25
Part B:
To solve the equation, we need to consider two cases:
Case 1: 250 - x ≤ 25
In this case, we have:
250 - x ≤ 25
x ≤ -225
x ≥ 225
Case 2: 250 - x ≥ -25
In this case, we have:
250 - x ≥ -25
x ≥ -275
x ≤ 275
Therefore, the solution to the absolute value equation is:
225 ≤ x ≤ 275
Part C:
The minimum amount the artist received for her products is $225, and the maximum amount is $275.
Step-by-step explanation:
HELP PLEASE I NEED HELP
Answer:
2nd choice. -a^3 - 8ab^2
Step-by-step explanation:
(3a^3b - 4ab^2 + 5ab) - (4a^3b + 4ab^2 + 5ab)
Distribute the minus sign and take out the parenthesis.
3a^3b - 4ab^2 + 5ab - 4a^3b - 4ab^2 - 5ab
Combine like terms.
3a^3b - 4ab^2 -4ab^2 - 4ab^2 + 5ab - 5ab
-1a^3b - 8ab^2
Complete the statement: triangle AED~triangle ___
Answer: AE=10, AD=14, x=5, BC=36, DE=52
Step-by-step explanation: finding x
4x-32=2(3x-21) || 4x-32=6x-42 || 10=2x || 5=x
Which pair of points has a slope of 4?
a. (1, 4), (–1, 4)
b. (0, 4), (4, 0)
c. (0, –3), (1, 1)
d. (3, 0), (–1, –1)
Answer: From the calculations, the pair of points with a slope of 4 is option c. (0, -3), (1, 1).
Step-by-step explanation:
To determine the slope between two points, we can use the formula:
slope = (change in y) / (change in x)
Let's calculate the slope for each pair of points:
a. (1, 4), (–1, 4)
The change in y is 4 - 4 = 0
The change in x is -1 - 1 = -2
slope = 0 / -2 = 0
b. (0, 4), (4, 0)
The change in y is 0 - 4 = -4
The change in x is 4 - 0 = 4
slope = -4 / 4 = -1
c. (0, –3), (1, 1)
The change in y is 1 - (-3) = 4
The change in x is 1 - 0 = 1
slope = 4 / 1 = 4
d. (3, 0), (–1, –1)
The change in y is -1 - 0 = -1
The change in x is -1 - 3 = -4
slope = -1 / -4 = 1/4
Answer:
c. (0, –3), (1, 1)
Step-by-step explanation:
To find the slope, we use the slope formula
m = ( y2-y1)/(x2-x1)
a. (1, 4), (–1, 4)
m = (4-4)/(-1-1) = 0/-2 = 0
b. (0, 4), (4, 0)
m = ( 4-0)/(0-4) = 4/-4 = -1
c. (0, –3), (1, 1)
m = ( -3-1)/(0-1) -4/-1 = 4
d. (3, 0), (–1, –1)
m = (0--1)/(3 - -1) =1/4
nneed answer and explanation for this
Answer:
276.460 mi²
Step-by-step explanation:
You want the surface area of a cylinder with radius 4 mi and height 7 mi.
AreaThe area of a cylinder is given by the formula ...
A = 2πr(r +h)
A = 2π(4 mi)(4 mi +7 mi) = 88π mi² ≈ 276.460 mi²
The area of the cylinder is about 276.460 square miles.
__
Additional comment
The surface area is the sum of the areas of the two circular bases and the lateral area. The lateral area is the product of the cylinder height and circumference. These are combined in the formula given.
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Urgent!
Given the following formula, solve for y1.
Formula: m = y²- y¹/ x² - x¹
After considering all the given options we conclude that the value of the given formula is y₁ = y₂ - m(x₂ - x₁) which is Option C.
To evaluate for y₁ in the equation m = (y₂ - y₁) / (x₂ - x₁), we can apply algebraic manipulation to isolate y₁.
In the first step, we multiply both sides of the equation by (x₂ - x₁) to eliminate the denominator. Therefore,
m(x₂ - x₁) = y₂ - y₁
In the second step, we can subtract y₂ from both sides of the equation to isolate y₁.
Therefore,
y₁ = y₂ - m(x₂ - x₁)
So, the solution for y₁ is given by the formula:
y₁ = y₂ - m(x₂ - x₁)
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the equation of a straight line L1 is given as 3x plus 2y is equal to 12. Another line L2 is perpendicular to L1 at (2,9).
(a) Find the equation of L2 in the fom y is equal to mx plus c where m and c are constants
(b) Another line L3 is parallel to L1 and passes through point (-4,-1). Find
(i) The equation of L2 in the form ax plus by is equal to c where m and c are intergers
(ii) The x and y intercepts of L3
(iii) The point of intersception between L2 and L3
The equation of line L2 in the form y = mx + c is y = (2/3)x + 23/3. the x-intercept of L3 is -14/3. the y-intercept of L3 is -7. The point of intersection between L2 and L3 is (-88/13, 41/13). The x-intercept of L3 is -14/3.
(a) To find the equation of line L2 perpendicular to line L1, we need to determine the slope of L1 and then use the negative reciprocal of that slope for L2.
Given the equation of line L1: 3x + 2y = 12
Rearrange the equation to isolate y:
2y = -3x + 12
y = (-3/2)x + 6
The slope of L1 is -3/2.
Since L2 is perpendicular to L1, the slope of L2 is the negative reciprocal of -3/2, which is 2/3.
Using the slope-intercept form y = mx + c, where m is the slope and c is the y-intercept, we can write the equation of L2:
y = (2/3)x + c
To find c, we substitute the coordinates of the point (2,9) into the equation:
9 = (2/3)(2) + c
9 = 4/3 + c
c = 9 - 4/3
c = 27/3 - 4/3
c = 23/3
Therefore, the equation of line L2 in the form y = mx + c is:
y = (2/3)x + 23/3
(b)(i) To find the equation of line L3 parallel to line L1, we can use the same slope as L1, which is -3/2, and substitute the given point (-4,-1) into the point-slope form y - y1 = m(x - x1):
y - (-1) = (-3/2)(x - (-4))
y + 1 = (-3/2)(x + 4)
y + 1 = (-3/2)x - 6
y = (-3/2)x - 7
Therefore, the equation of line L3 in the form ax + by = c is:
(3/2)x + y = -7
(ii) To find the x-intercept of L3, we set y = 0 and solve for x:
0 = (-3/2)x - 7
(3/2)x = -7
x = (-7)(2/3)
x = -14/3
Therefore, the x-intercept of L3 is -14/3.
To find the y-intercept of L3, we set x = 0 and solve for y:
y = (-3/2)(0) - 7
y = -7
Therefore, the y-intercept of L3 is -7.
(iii) To find the point of intersection between L2 and L3, we can set the equations of L2 and L3 equal to each other and solve for x and y:
(2/3)x + 23/3 = (-3/2)x - 7
To solve for x:
Multiply both sides by 6 to eliminate the fractions:
4x + 46 = -9x - 42
4x + 9x = -42 - 46
13x = -88
x = -88/13
Substitute the value of x back into either equation to solve for y:
y = (2/3)(-88/13) + 23/3
y = -176/39 + 299/39
y = 123/39
y = 41/13
Therefore, the point of intersection between L2 and L3 is (-88/13, 41/13).
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People are invited to compete to be a contestant in a television quiz show.
Here are some possible outcomes for the person who is chosen.
A: The contestant is a woman over 25 years old. B: The contestant is a man.
C: The contestant is 21 years old. D: The contestant is a 30-year-old man.
a List the possible pairs of mutually exclusive outcomes.
b List three of the outcomes that are all mutually exclusive.
c What can you say about the probabilities of B and D?
a) The possible pairs of mutually exclusive outcomes are given below:
A and B
A and C
A and D
B and C
B and D
C and D
b) The Three of the outcomes that are said to be all mutually exclusive are:
A (The contestant is a woman over 25)B ( The contestant is a man.)C (The contestant is 21 years old )c) The probability of having B and D is written as P(B or D) = P(B) + P(D)
What is the probability?Mutually exclusive events cannot happen at the same time, like rolling a kick the bucket and getting a 1 and a 2. In this case, there are four conceivable results: A, B, C, and D, a few of which we commonly select.
For example, If A is the outcome, C or D cannot be. To find mutually exclusive pairs, we check which outcomes cannot occur together. A and B are mutually exclusive because they cannot both be true.
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Find the expected value of the winnings don a game that has the following payout probability distribution
The expected value of the winnings in this game is $1.23.
We have,
The expected value of a random variable is the sum of the products of each possible outcome and its probability.
In this case, the random variable is the winnings from the game and the payout probability distribution specifies the probabilities associated with each possible payout.
The expected value of the winnings is found by multiplying each payout by its probability and summing the products.
Expected value = (0)(0.50) + (1)(0.25) + (2)(0.13) + (4)(0.06) + (8)(0.06)
= 0 + 0.25 + 0.26 + 0.24 + 0.48
= 1.23
Therefore,
The expected value of the winnings in this game is $1.23.
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Determine the scale factor from triangle BAC to triangle GHF
The scale factor from triangle BAC to triangle GHF is 3/4.
We have,
The two triangles are:
ΔBAC and ΔGHF
Now,
The scale factor can be used as:
Taking the corresponding sides.
BA x M = GH
36 x M = 27
M = 27/36
M = 3/4
We can also see that,
EC x 3/4 = CF
28 x 3/4 = 21
7 x 3 = 21
21 = 21
Thus,
The scale factor from triangle BAC to triangle GHF is 3/4.
Learn more about scale factors here:
https://brainly.com/question/20759556
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