Marco has a bag of red, blue, and green tiles. Which set of events would be considered independent? A tile is drawn and replaced, and then a second tile is drawn. A tile is drawn and removed, and then a second tile is drawn. A red or blue or green tile is drawn. Two tiles are drawn at the same time.

The expression in the scientific notation will be 7.79 × [tex]10^{7}[/tex] .

Simplifying 8.2 × [tex]10^{7}[/tex] - 4.1 × [tex]10^{6}[/tex]

To simplify the equation power should be same

To convert to decrease power the decimal will move to the right

It can be written as

8.2 × [tex]10^{7}[/tex] = 82.0 × [tex]10^{6}[/tex]

Now solving the equation

82.0 × [tex]10^{6}[/tex] - 4.1 × [tex]10^{6}[/tex]

= 77.9 × [tex]10^{6}[/tex]

To convert the equation into scientific notation

The decimal should be after one significant figure

To convert to increase power the decimal will move to the left

It can be written as

7.79  × [tex]10^{7}[/tex]

Simplifying the equation will give 7.79 × [tex]10^{7}[/tex] .

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The numbers that would be considered rational are -0.3/2, 0.7 and 3/2. The correct option is B.

We are given that;

The four options

Now,

A rational number is a number that can be written as a fraction of two integers. For example, 3/2 and 0.7 are rational numbers because they can be written as 3/2 and 7/10 respectively. However, √2 and pi are not rational numbers because they cannot be written as fractions of integers. They are irrational numbers because their decimal expansions are non-terminating and non-repeating. You can write your answer as:

Therefore, by the given fraction the answer will be -0.3/2, 0.7 and 3/2.

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The cosine of angle C is 7/25 and using tangent, the value of C is 73.7°

Trigonometric Ratios are defined as the values of all the trigonometric functions based on the value of the ratio of sides in a right-angled triangle.

sinθ = opp/ hyp

cos θ = adj/ hyp

tan θ = opp/adj

The value of cosine of C is

cos C = adj/hyp

= 7/25

therefore the value of cos C is 7/25

to find the value of C

Tan C = 24/7

TanC = 3.43

C = tan^-1 ( 3.43)

C = 73.7°

Therefore the value of C is 73.7°

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The joint probability of x and y, given y=y and x follows an exponential distribution with parameter y, is:

P(x=x, y=y) = e^(-x-y) / y

To find the joint probability of x and y, we can use the conditional probability formula:
P(x=x, y=y) = P(x=x | y=y) * P(y=y)

Since we know that y follows an exponential distribution with parameter 1, we can write:
P(y=y) = f(y) = e^(-y)

Now, to find the conditional probability of x given y, we can use the probability density function of the exponential distribution:
f(x | y=y) = λ * e^(-λ*x)

where λ = 1/y, since y is the parameter of the exponential distribution.

Therefore,
P(x=x | y=y) = (1/y) * e^(-x/y)

Combining these equations, we get:
P(x=x, y=y) = (1/y) * e^(-x/y) * e^(-y)

Simplifying this expression, we get:
P(x=x, y=y) = e^(-x-y) / y

So the joint probability of x and y, given y=y and x follows an exponential distribution with parameter y, is:

P(x=x, y=y) = e^(-x-y) / y

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The limit of (7x-sin(7x))/(7x-tan(7x)) as x approaches 0 using L'Hospital's rule is 0.

To evaluate the limit using L'Hospital's rule, we can take the derivative of the numerator and the denominator separately and then take the limit again.

lim x→0 (7x - sin(7x)) / (7x - tan(7x))

Taking the derivative of the numerator:

d/dx [7x - sin(7x)] = 7 - 7cos(7x)

Taking the derivative of the denominator:

d/dx [7x - tan(7x)] = 7 - 7sec²(7x)

Substituting back into the original limit expression and simplifying:

lim x→0 (7 - 7cos(7x)) / (7 - 7sec²(7x))

As x approaches 0, both cos(7x) and sec²(7x) approach 1. Therefore, we can substitute 1 for both expressions:

lim x→0 (7 - 7cos(7x)) / (7 - 7sec²(7x)) = lim x→0 (7 - 7) / (7 - 7) = 0/0

The limit is of indeterminate form 0/0, so we can apply L'Hospital's rule again. Taking the derivatives of the numerator and denominator:

Substituting back into the limit and simplifying:

lim x→0 (49sin(7x)) / (98sec(7x)tan(7x)) = lim x→0 (7sin(7x)) / (14sec(7x)tan(7x))

As x approaches 0, sec(7x) and tan(7x) approach 1. Therefore, we can substitute 1 for both expressions:

lim x→0 (7sin(7x)) / (14sec(7x)tan(7x)) = lim x→0 (7sin(7x)) / (14)

As x approaches 0, sin(7x) approaches 0. Therefore, the limit simplifies to:

lim x→0 (7sin(7x)) / (14) = 0

Therefore, the limit is 0.

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The linear approximation of sin(9x) at x = 0 is A + Bt, where A = sin(0) = 0 and B = f'(0) = 9 that  is  sin(9x) ≈ 0 + 9x = 9x

The linear approximation of a function at a point is given by its first-order Taylor polynomial, which can be expressed as f(a) + f'(a)(x-a). In this case, we have a = 0 and f(x) = sin(9x), so we need to find f'(x) and evaluate it at x = 0.

Taking the derivative of sin(9x) with respect to x, we get:

f'(x) = 9cos(9x)

Evaluating this at x = 0, we get:

f'(0) = 9cos(0) = 9

So the linear approximation of sin(9x) at x = 0 is given by:

sin(9x) ≈ 0 + 9x = 9x

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Martina used 16 pounds of type A coffee in her blend.

What is algebra?

Algebra is a branch of mathematics that deals with mathematical operations and symbols used to represent numbers and quantities in equations and formulas. It involves the study of variables, expressions, equations, and functions.

Let's assume that Martina used x pounds of type A coffee in her blend. Since the blend used four times as many pounds of type B coffee as type A, the amount of type B coffee used would be 4x pounds.

The total cost of the blend is given as the sum of the cost of type A and type B coffee, so we can write:

Cost = Cost of type A + Cost of type B

= x* + 4x*

Simplifying the expression, we get:

Cost = ( + 4) x

We are given that the total cost of the blend is , so we can write:

( + 4) x =

Solving for x, we get:

x = / ( + 4)

Substituting the given values, we get:

x = / ( + 4)

= / ( + 4)

= / ( + 4)

Therefore, Martina used 16 pounds of type A coffee in her blend.

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One possible solution could be to allow birth mothers to have as many children as they want, but enforce strict population control measures on the entire community to ensure resources are not depleted.

The practice of releasing one twin in The Giver is a harsh and unjust method of population control. In a hypothetical scenario where population growth is a concern, there are more humane and effective ways to address it. For instance, the community could implement measures such as providing incentives for small families, investing in education and healthcare to reduce infant mortality rates, and promoting family planning. Additionally, the community could implement policies to encourage sustainable resource use and reduce waste, such as recycling and renewable energy initiatives. By taking a comprehensive and sustainable approach to population control, the community can ensure a better future for all its members, without resorting to cruel and arbitrary methods like releasing babies.

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The number of free throws expected basketball player to make by using proportion is equal to 180.

Percent of free throw attempted by basketball player = 80%

Number of free throws basketball player attempts in practice  = 225

If the basketball player makes 80% of the free throws she attempts,

we can expect her to make 80 out of every 100 free throws attempted.

To find out how many free throws she would make if she attempted 225, we can set up a proportion,

80/100 = x/225

We can solve for x by cross-multiplying the expression we get,

⇒ 100x = 80 × 225

⇒ 100x = 18000

⇒ x = 18000/100

⇒ x = 180

Therefore, we can expect the basketball player to make 180 free throws out of 225 attempts in practice using proportion.

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Therefore, the first four terms of the sequence are 5, 2, -1, and The first four terms of the sequence can be found by substituting the values of n = 1, 2, 3, and 4 into the general term a_n = -3n + 8.

For n = 1:

a_1 = -3(1) + 8 = 5

For n = 2:

a_2 = -3(2) + 8 = 2

For n = 3:

a_3 = -3(3) + 8 = -1

For n = 4:

a_4 = -3(4) + 8 = -4

Therefore, the first four terms of the sequence are 5, 2, -1, and -4. Starting with n = 1, we substitute it into the equation and calculate the value of a_1. Similarly, we repeat this process for n = 2, 3, and 4 to find the corresponding terms of the sequence.

In this case, the general term -3n + 8 represents a linear sequence where the term decreases by 3 each time n increases by 1. The initial value is 8, and the common difference is -3.

As we substitute different values of n, we can observe how the sequence progresses and identify the specific terms. In this example, the first four terms of the sequence are found to be 5, 2, -1, and -4.

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To the nearest foot, the person would fall approximately 20 feet before hitting the ground. This highlights the importance of using ladders safely and following proper safety protocols.

Ladders are indeed dangerous if not used correctly, and accidents can happen even with the slightest miscalculation or carelessness. In this scenario, we have a 20 ft extension ladder placed on a wall, making an angle of elevation of 85 degrees with the ground. If the person at the top of the ladder leaned back, rotating the ladder away from the wall, we need to determine how far they would fall before hitting the ground.
To solve this problem, we need to use trigonometry. The angle of elevation is 85 degrees, which means the complementary angle is 5 degrees. We can use the tangent function to find the length of the ladder that is off the wall, which is the height the person will fall from.
tan(5) = height of ladder off the wall / length of ladder
Length of ladder = 20 ft
Height of ladder off the wall = tan(5) x 20 = 1.75 ft
Therefore, if the person at the top of the ladder leaned back and rotated it away from the wall, they would fall approximately 1.75 ft before hitting the ground. It is important to always follow ladder safety guidelines and use caution when using a ladder to avoid accidents and injuries.
Using a ladder can indeed be dangerous if not used correctly. In this scenario, we have a 20 ft extension ladder placed on a wall at an angle of elevation of 85 degrees. To determine how far the person would fall before hitting the ground when the ladder rotates away from the wall, we'll need to use trigonometry.
Step 1: Identify the known values.
- The ladder length (hypotenuse) is 20 ft.
- The angle of elevation is 85 degrees.
Step 2: Determine the height of the ladder when it's placed against the wall.
- We can use the sine function to find the height: sin(angle) = height / ladder_length.
- Plug in the known values: sin(85) = height / 20.
Step 3: Solve for the height.
- Multiply both sides by 20: height = 20 * sin(85).
- Calculate the height: height ≈ 19.98 ft.
Step 4: Determine the distance the person falls.
- The person falls from the height of the ladder to the ground, so the falling distance is approximately 19.98 ft.
To the nearest foot, the person would fall approximately 20 feet before hitting the ground. This highlights the importance of using ladders safely and following proper safety protocols.

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The gross debt of a country stood at about $23 trillion at the end of a year, which translates to approximately $81,335 per person assuming a population of about 283 million.

To express the gross debt of a country in dollars per person, we need to divide the total gross debt by the population of the country. In this case, dividing $23 trillion by a population of about 283 million yields approximately $81,335 per person.

Expressing the gross debt in dollars per person provides a useful measure of the burden of the debt on individuals. In this case, the amount of debt per person is substantial, indicating a high level of indebtedness of the country. However, it is important to note that this measure does not take into account the distribution of the debt among different segments of the population or the ability of the country to service the debt. Therefore, other measures such as debt-to-GDP ratio and debt service ratio are also used to assess a country's debt sustainability.

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The graph of the function y = x^2 + 2x - 5 is a U-shaped curve opening upwards, with the vertex at (-1, -4).

To graph the function y = x^2 + 2x - 5, we can follow a few steps to plot the points and sketch the curve.

Step 1: Determine the vertex of the parabola.

The vertex of the parabola occurs at the minimum or maximum point. We can find the x-coordinate of the vertex by using the formula x = -b/2a, where a, b, and c are coefficients of the quadratic equation in standard form (ax^2 + bx + c = 0).

For our function, a = 1, b = 2, and c = -5.

Plugging these values into the formula, we get x = -2/2(1) = -1.

To find the y-coordinate of the vertex, we substitute the x-coordinate back into the function: y = (-1)^2 + 2(-1) - 5 = -4.

Therefore, the vertex is at (-1, -4).

Step 2: Find additional points.

To plot more points, we can choose some x-values and calculate the corresponding y-values using the function. Let's select x-values of -3, 0, and 2.

For x = -3, y = (-3)^2 + 2(-3) - 5 = 9 - 6 - 5 = -2.

For x = 0, y = (0)^2 + 2(0) - 5 = 0 + 0 - 5 = -5.

For x = 2, y = (2)^2 + 2(2) - 5 = 4 + 4 - 5 = 3.

Step 3: Plot the points and sketch the curve.

Plot the points (-3, -2), (0, -5), (2, 3), and the vertex (-1, -4) on a coordinate plane.

The vertex (-1, -4) is the lowest point, so the parabola opens upwards.

Connect the points with a smooth curve, following the shape of a parabola.

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Answer:

See below

Step-by-step explanation:

Slope-intercept form of an equation of line:

[tex]y = mx + c[/tex]  —— eq(i)

Where:

c = y-intercept

  = y-value for which the corresponding x-value is 0

  = [tex]-1[/tex] (From the provided table)

m = slope
   = [tex]\frac{rise}{run}[/tex]

   = [tex]\frac{y_{2} - y_{1}}{x_{2} - x_{1}}[/tex] —- eq(ii)

Choose any two sets of coordinates and then substitute in eq(ii). I chose:

[tex](3, 8)[/tex] as [tex](x_{1}, y_{1})[/tex]

[tex](4, 11)[/tex] as [tex](x_{2}, y_{2})[/tex]

   = [tex]\frac{11 - 8}{4 - 3}[/tex]

   = [tex]\frac{3}{1}[/tex]

∴ m = [tex]3[/tex]

Substituting the values of c and m in eq(i):

[tex]y = (3)x + (-1)[/tex]

∴ Equation for the function

[tex]y = 3x - 1[/tex]

The solution is:

the probability that the two butterflies she spots will both be type A butterflies is 0.0044

The computation of the  probability that the two butterflies she spots will both be type A butterflies is shown below:

= 1 ÷ Type A × 1 ÷ Type A

= 1 ÷ 15 × 1 ÷ 15

= 1 ÷ 225

= 0.0044

Hence, the  probability that the two butterflies she spots will both be type A butterflies is 0.0044

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complete questio:

Susie is looking for butterflies in an area where: 15% of the butterflies are of type A 30% of the butterflies are of type B 55% of the butterflies are of type C Suppose that she spots two butterflies on her walk, and that the types of the two butterflies are independent from each other (perhaps because they are spotted in different locations). (a) What is the probability that the two butterflies she spots will both be type A butterflies

a) Null Hypothesis is μ ≤ 21.6 and Alternative Hypothesis is μ > 21.6.

b) Point estimate of the difference between mean annual consumption in Webster City and the national mean is 2.5.

c) We can conclude that there is sufficient evidence to suggest that the mean annual consumption of milk in Webster City is higher than the national mean.

A. The hypothesis test to determine whether the mean annual consumption in Webster City is higher than the national mean can be set up as follows:

Null Hypothesis: μ ≤ 21.6

Alternative Hypothesis: μ > 21.6

where μ is the true population mean annual consumption of milk in Webster City.

B. The point estimate of the difference between mean annual consumption in Webster City and the national mean is simply the difference between the sample mean and the national mean:

Point Estimate = x' - μ = 24.1 - 21.6 = 2.5

C. To test for a significant difference at α = 0.05, we need to calculate the test statistic and compare it to the critical value.

t = (x' - μ) / (s / √n) = (24.1 - 21.6) / (4.8 / √16) = 2.083

Using a t-table with 15 degrees of freedom and a significance level of 0.05, we find the critical value to be 1.753. Since our test statistic (2.083) is greater than the critical value (1.753), we reject the null hypothesis.

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Answer:

G(9, -5)

Step-by-step explanation:

Point G is not shown in the figure, but I assume point G is on the bottom side of the square, directly below point F.

We are told each side of the square is 8 units long.

Starting at point E, to get to point G, go 8 units right and 8 units down.

Start at E(1, 3).

Then go 8 units right to point F(9, 3).

Now go 8 units down to point G(9, -5).

The value of x that makes the denominators equal to zero are x = -3 and x = 3.

To find the value(s) of the variable that undefine the expression, we need to identify when the denominators are equal to zero. The given expression is:
((x^2 - 8x + 12)/(x^2 - 9)) / ((x - 6)/(x + 3))
Step 1: Identify the denominators in the expression:
Denominator 1: (x^2 - 9)
Denominator 2: (x + 3)
Step 2: Set each denominator equal to zero and solve for x:
Denominator 1: (x^2 - 9) = 0
x^2 = 9
x = ±3
Denominator 2: (x + 3) = 0
x = -3
Step 3: List the value(s) of x that undefine the expression:
The value of x that makes the denominators equal to zero are x = -3 and x = 3. Thus, these are the values that undefine the given expression.

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Answer: 5/4

Step-by-step explanation:

Ah yes terminal angles. I love these. Here's a formula to solve these.

With point P(x,y) and value r where r = square-root of x square + y square, we have:

Sin = y/r

Cos = x/r

Tan = y/x

Csc = r/y

Sec = r/x

Cot = x/y

so tan = y/x. here y = 5 and x = 4 so the answer is 5/4

Answer:

b. 5/4

Step-by-step explanation:

Without knowing the exact angle C, we cannot determine the value of tan θ.

However, we can use the coordinates of point P to determine the ratio of the opposite side to the adjacent side (which is equal to the value of tan θ).

Recall that in the coordinate plane, the x-coordinate represents the adjacent side and the y-coordinate represents the opposite side.

Therefore, in this case:

adjacent side = 4

opposite side = 5

tan θ = opposite/adjacent = 5/4

So, tan θ = 1.25.

1.25 = 5/4

Answer:

p(not blue) = 11/13 = 0.8461538462 = approx 0.85 = approx 85%

Step-by-step explanation:

65-10 = 55 are not blue, so 55 out of 65 cars are not blue.

p(not blue) = 55/65 = 11/13 = 0.8461538462 = approx 0.85 = approx 85%

the given differential equation is y = csec(x-59°).

To solve the given differential equation, we can start by separating the variables and integrating both sides. So, we have:

dy/dx = ysin(x)cos(59x)

dy/y = sin(x)cos(59x) dx

Integrating both sides, we get:

ln|y| = -cos(x)sin(59x) + C

where C is the arbitrary constant of integration.

Taking exponential of both sides, we get:

|y| = e^(-cos(x)sin(59x)+C)

Now, we can simplify this expression by considering the absolute value of y. Since we know that y cannot be negative in the given domain, we can drop the absolute value signs. Also, using the trigonometric identity sec(x) = 1/cos(x), we get:

y = e^(-cos(x)sin(59x)+C)  or y = e^(sin(59x)cos(x)-C)

But, we can write this solution in a more elegant form by using the trigonometric identity sec(x-a) = 1/cos(x-a), where a = 59°. This gives us:

y = e^(-cos(x-59°)sin(59°)+C) or y = e^(sin(59°)cos(x-59°)-C)

Simplifying further, we get:

y = csec(x-59°) or y = csc(31°)sec(x-59°)

where c = e^(-sin(59°)cos(59°)+C) or c = e^(sin(59°)cos(31°)-C)

Therefore, the general solution to the given differential equation is y = csec(x-59°), where c is the arbitrary constant of integration.

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The area of the playground will be 1,654 square yards. Thus, the correct option is A.

The area of a two-dimensional figure is the area that its perimeter encloses. The quantity of unit squares that occupy a closed figure's surface is its region.

The area of the playground is the combination of the area of a rectangle and two triangles. Then the area of the playground is calculated as,

A = 25 x 45 + 1/2 x 12 x 45 + 1/2 x 14 x (12 + 25)

A = 1,125 + 270 + 259

A = 1,654 square yards

Thus, the correct option is A.

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The exact values of the trigonometric functions are (a) cos(19π/6) = √3/2,

(b) cos(-7π/6) = -√3/2, (c) cos(-11π/6) = -√3/2

To find the exact values of the trigonometric functions at the given angles, we can use the unit circle and the periodicity and symmetry properties of the functions.

(a) cos(19π/6):

First, we note that 19π/6 is equivalent to 18π/6 + π/6, which is equivalent to 3π + π/6. Since cosine has period 2π, we can reduce 3π to π and write:

cos(19π/6) = cos(3π + π/6) = cos(π/6) = √3/2

(b) cos(-7π/6):

We can use the symmetry property of cosine to write:

cos(-7π/6) = cos(π - 7π/6) = -cos(π/6) = -√3/2

(c) cos(-11π/6):

We can again use the symmetry property of cosine to write:

cos(-11π/6) = cos(π - 11π/6) = -cos(π/6) = -√3/2

Therefore, the exact values of the trigonometric functions are:

(a) cos(19π/6) = √3/2

(b) cos(-7π/6) = -√3/2

(c) cos(-11π/6) = -√3/2

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Harold had originally 100 pencils.

Let X be the number of pencils Harold had originally. After giving 17 to his friend Carl, he had X-17 left. Then, after giving 35 to his teacher, he had X-17-35 left, which is equal to 48.

Therefore, we can set up an equation: X-17-35=48. Solving for X, we get X=100 pencils.

Thus, Harold originally had 100 pencils. To check, we can verify that after giving 17 to Carl and 35 to his teacher, he is left with 48, which matches the information given in the problem.

This problem can also be solved by using algebraic equations, but since there are only two steps involved, we can use simple arithmetic to arrive at the answer.

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So the triangle has three equal angles of 60 degrees.

To find the measures of the angles of the triangle with vertices at (-2,0), (2,1), and (1,-2), we can use trigonometry.

Let's use the following notation:

a = (-2,0)

b = (2,1)

c = (1,-2)

First, we need to find the coordinates of the midpoint of line segment AB, which is the length of the hypotenuse of the triangle.

Using the Pythagorean theorem, we have:

[tex]c^2 = a^2 + b^2\\1^2 + (-2)^2 = 2^2 + 1^2[/tex]

25 = 4 + 1

23 = 3

So the length of the hypotenuse is 3 units.

Next, we need to find the coordinates of the midpoint of line segment BC, which is the length of one of the legs of the triangle.

Again, using the Pythagorean theorem, we have:

[tex]b^2 = a^2 + c^2\\1^2 + (-2)^2 = 2^2 + 1^2[/tex]

25 = 4 + 1

23 = 3

So the length of the leg of the triangle is 3 units.

Now, we can use the law of cosines to find the measures of the angles of the triangle.

Let's denote the angle between lines AB and BC as alpha, the angle between lines AB and AC as beta, and the angle between lines BC and AC as gamma.

Using the law of cosines, we have:

[tex]cos(alpha) = (b^2 + c^2 - a^2) / (2bc)\\cos(beta) = (a^2 + c^2 - b^2) / (2ac)\\cos(gamma) = (a^2 + b^2 - c^2) / (2ab)[/tex]

We know that:

a = (-2,0)

b = (2,1)

c = (1,-2)

So we can substitute these values into the above equations:

[tex]cos(alpha) = (2^2 + (-2)^2 - (-2)^2) / (2(-2)1) = (2 + (-2) + 2) / (2(-2)1) = 4 / 3\\cos(beta) = ((-2)^2 + 2^2 - (-2)^2) / (2(-2)2) = (-2 + 4 + 2) / (2(-2)2) = -1\\cos(gamma) = (2^2 + 1^2 - 1^2) / (2(1)(-2)) = 2 + (-1) + (-1) / (2(1)(-2)) = 1[/tex]

Now we can substitute these values into the Pythagorean theorem to find the length of the legs of the triangle:

sin(alpha) = length of leg 1 / (2bc)

sin(beta) = length of leg 2 / (2ac)

sin(gamma) = length of leg 2 / (2ab)

We know that:

a = (-2,0)

b = (2,1)

c = (1,-2)

So we can substitute these values into the above equations:

sin(alpha) = √(8) / (2(-2)1)

= √(8) / √(3)

= √(2)

sin(beta) = √(5) / (2(1)2)

= √(5) / √(3)

= √(2)

sin(gamma) = √(5) / (2(1)(-2))

= √(5) / 1

= √(5)

Therefore, the measures of the angles of the triangle are:

alpha = 60 degrees

beta = 60 degrees

gamma = 60 degrees

So the triangle has three equal angles of 60 degrees.  

Learn more about triangle visit: brainly.com/question/28470545

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