What does AB represent in this figure

Answers

Answer 1

Answer:

A ray is a half-infinite line.AB represents a ray.

What is a ray?

A ray is a half-infinite line (sometimes called a half-line) in which one of the two points A and B is assumed to be at infinity.

As we can see that AB has a point on one side while the other side of the line has an arrow, therefore, AB represents a ray.

Learn more about Ray:

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Answer 2

Answer:

Answer:

B. Ray

Step-by-step explanation:

When they ask what does AB represent because they put the A first this means that the line is going from A to B and because there is an arrow and the end of B this means its a ray.

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Solve S=lw+wh+lh for h

Answers

Answer:

Solve the equation.

−

Step-by-step explanation:

Help needed! Due by 6/22/19

Answers

$y=(k)/(x)$

$12=(k)/(13)\n\nk=156$

$y=(156)/(x)$

$y=(156)/(44)=(39)/(11)$

Find the product of this expression.
(a - 12)(a + 12) =

Answers

Answer:

Combine like terms, a2−144

Step-by-step explanation:

What is the estimate of 19% of $53

Answers

The exact answer is 10.07 but an estimate would be $10.

Hope this helps :)

Simplify: (8^2/3)^4

Answers

So, $(8^(2/3))^4$ simplifies to 16, it can be solved according to the process of simplification process

To simplify the expression (8^(2/3))^4, we follow the order of operations, which is to evaluate the exponent inside the parentheses first, and then raise the result to the power of 4.

Step 1: Evaluate the exponent inside the parentheses.

$(8^(2/3))$ means taking the cube root of 8 raised to the power of 2. The cube root of 8 is 2, so we have:

$(8^(2/3))$ = 2

Step 2: Raise the result to the power of 4.

Now, we have:

$(2)^4$ = 2 * 2 * 2 * 2 = 16

So, $(8^(2/3))^4$ simplifies to 16.

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Answer:

Step-by-step explanation:

hello :

(8^2/3)^4 = ∛(8²) = ∛(4^3) = 4 because : 8² = 4^3 =64

Samir is an expert marksman. When he takes aim at a particular target on the shooting range, there is a 0.950.950, point, 95 probability that he will hit it. One day, Samir decides to attempt to hit 101010 such targets in a row.

Answers

The question is incomplete. Here is the complete question:

Samir is an expert marksman. When he takes aim at a particular target on the shooting range, there is a 0.95 probability that he will hit it. One day, Samir decides to attempt to hit 10 such targets in a row.

Assuming that Samir is equally likely to hit each of the 10 targets, what is the probability that he will miss at least one of them?

Answer:

40.13%

Step-by-step explanation:

Let 'A' be the event of not missing a target in 10 attempts.

Therefore, the complement of event 'A' is $\overline A=\textrm{Missing a target at least once}$

Now, Samir is equally likely to hit each of the 10 targets. Therefore, probability of hitting each target each time is same and equal to 0.95.

Now, $P(A)=0.95^(10)=0.5987$

We know that the sum of probability of an event and its complement is 1.

So, $P(A)+P(\overline A)=1\n\nP(\overline A)=1-P(A)\n\nP(\overline A)=1-0.5987\n\nP(\overline A)=0.4013=40.13\%$

Therefore, the probability of missing a target at least once in 10 attempts is 40.13%.

Answer:

.401

Step-by-step explanation:

However if it states to round to the nearest tenth then its .4

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