# Which of the equations will be a true statement if

p

=

10

3

? Select the two choices that apply.

## In order to determine which equations are true when p = 103, we need to evaluate each equation using that value.

1. p + 10 = 103 + 10 = 113

2. p - 5 = 103 - 5 = 98

3. 2p = 2 * 103 = 206

4. p/10 = 103 / 10 = 10.3

5. p * 3 = 103 * 3 = 309

Out of these equations, the true statements are:

1. p + 10 = 113

4. p/10 = 10.3

Therefore, the correct choices are 1 and 4.

## To determine which equations will be true when p = 10/3, we need to substitute 10/3 for p in each equation and check if the equation holds true.

Let's examine the given options:

1) p + 1 = 10/3 + 1

To solve this, we simply substitute p with 10/3:

10/3 + 1 = 10/3 + 3/3

This simplifies to:

10/3 + 1 = 13/3

Since 13/3 is not equal to 10/3, this equation is not true.

2) p - 2 = 10/3 - 2

Let's substitute p with 10/3:

10/3 - 2 = 10/3 - 6/3

This simplifies to:

10/3 - 2 = 4/3

Since 4/3 is not equal to 10/3, this equation is not true.

3) p * 3 = 10/3 * 3

By substituting p with 10/3:

10/3 * 3 = 10/3 * 1

This simplifies to:

10 = 10

Since both sides are equal, this equation is true when p = 10/3.

4) p / (10/3) = (10/3) / (10/3)

Substituting p with 10/3:

(10/3) / (10/3) = (10/3) / (10/3)

This simplifies to:

1 = 1

Since both sides are equal, this equation is true when p = 10/3.

From the options, the equations that will be true when p = 10/3 are:

1) p * 3 = 10/3 * 3

2) p / (10/3) = (10/3) / (10/3)

Therefore, the correct choices are options 3 and 4.

## Do not express your equations vertically. Also choices not given. you cannot copy and paste here.

I assume you mean p = 10^3 = 1000