Ask question

Ask question

All categories

3 years ago

8

ILL GIVE BRAINILEST: Write an equation for the triangle and solve the equation to find the value of the variable then find the a

ngle measures

1 answer:

nekit [7.7K]3 years ago

7 0

Step-by-step explanation:

180°= 3q+q+q (Sum of angles in a triangle)

180°=5q

q=180÷5

q=36

Acute angle=36°

Obtuse angle=108°

You might be interested in

Which of the following is not a correct description of the graph of the function y = -2x - 7?

swat32

The graph of the function contains the points (0,-7), (1,-9), and (3,-1) is incorrect

it contains all the points except the last set...(3,-1)
y = -2x - 7
-1 = -2(3) - 7
-1 = -6-7
-1 = - 13 (incorrect)

7 0

4 years ago

|x|-8=5 help me pls some one help me

MariettaO [177]

The answer is X=13 because 13-8=5

6 0

4 years ago

Read 2 more answers

Suppose that X has a Poisson distribution with a mean of 64. Approximate the following probabilities. Round the answers to 4 dec

o-na [289]

Answer:

(a) The probability of the event (<em>X</em> > 84) is 0.007.

(b) The probability of the event (<em>X</em> < 64) is 0.483.

Step-by-step explanation:

The random variable <em>X</em> follows a Poisson distribution with parameter <em>λ</em> = 64.

The probability mass function of a Poisson distribution is:

$P(X=x)=\frac{e^{-\lambda}\lambda^{x}}{x!};\ x=0, 1, 2, ...$

(a)

Compute the probability of the event (<em>X</em> > 84) as follows:

P (X > 84) = 1 - P (X ≤ 84)

$=1-\sum _{x=0}^{x=84}\frac{e^{-64}(64)^{x}}{x!}\\=1-[e^{-64}\sum _{x=0}^{x=84}\frac{(64)^{x}}{x!}]\\=1-[e^{-64}[\frac{(64)^{0}}{0!}+\frac{(64)^{1}}{1!}+\frac{(64)^{2}}{2!}+...+\frac{(64)^{84}}{84!}]]\\=1-0.99308\\=0.00692\\\approx0.007$

Thus, the probability of the event (<em>X</em> > 84) is 0.007.

(b)

Compute the probability of the event (<em>X</em> < 64) as follows:

P (X < 64) = P (X = 0) + P (X = 1) + P (X = 2) + ... + P (X = 63)

$=\sum _{x=0}^{x=63}\frac{e^{-64}(64)^{x}}{x!}\\=e^{-64}\sum _{x=0}^{x=63}\frac{(64)^{x}}{x!}\\=e^{-64}[\frac{(64)^{0}}{0!}+\frac{(64)^{1}}{1!}+\frac{(64)^{2}}{2!}+...+\frac{(64)^{63}}{63!}]\\=0.48338\\\approx0.483$

Thus, the probability of the event (<em>X</em> < 64) is 0.483.

5 0

3 years ago

How should I write the story.

Alexeev081 [22]

There were 20 people in a bar. 10 people left. Then 4 more people left. 6 people were left

6 0

3 years ago

Radian and degrees PLZ HELP

Katen [24]

To convert the angle in radian measure to degree measure, multiply it by 180/π.

The given angle in radian measure is 257π/360 . Multiply it by 180/π to get the angle in degrees.

So,

The angle in degrees = 257π/360 x 180/π = 257/2 = 128.5 degrees

4 0

3 years ago