1. Factor Form : 1x1x1x1

Exponent Form : 1^4
Standard Form : 1

2. Factor Form :2x2x2
Exponent Form : 2^3
Standard : 8

3.Factor Form : (-6)(-6)(-6)
Exponent Form : (-6)^3
Standard : -216

4.Factor Form : 5x5x5
Exponent form : 5^3
Standard 125

Your answers are correct.

6. Factor Form : 3x3x3x3

Exponent :3^4
Standard: 81

7.2x2x2x2x2
Exponent : 2^5
Standard: 32

8. NxN
Exponent N^2
Standard: N/A because N doesn't stand for anything in this problem

9. Factor Form : RxRxRxRxR
Exponent : R^5
Standard : N/A

I agree.

Thank you, Ms. Sue :)

You're welcome, Jerald.

To find the exponent form from the factor form, you need to raise each factor to its corresponding exponent and multiply them together.

For example, in the first example, the factor form is 1x1x1x1, which means all the factors are 1. To convert it to exponent form, you raise each factor, 1, to the power of 1, and multiply them together: 1^1 x 1^1 x 1^1 x 1^1 = 1 x 1 x 1 x 1 = 1. So the exponent form is 1^4.

In the second example, the factor form is 2x2x2. To convert it to exponent form, you raise each factor, 2, to the power of 1, and multiply them together: 2^1 x 2^1 x 2^1 = 2 x 2 x 2 = 8. So the exponent form is 2^3.

In the third example, the factor form is (-6)(-6)(-6). To convert it to exponent form, you raise each factor, -6, to the power of 1, and multiply them together: (-6)^1 x (-6)^1 x (-6)^1 = -6 x -6 x -6 = -216. So the exponent form is (-6)^3.

In the fourth example, the factor form is 5x5x5. To convert it to exponent form, you raise each factor, 5, to the power of 1, and multiply them together: 5^1 x 5^1 x 5^1 = 5 x 5 x 5 = 125. So the exponent form is 5^3.

To get the standard form, you simply evaluate the exponent. In all these examples, the exponent is 3 or 4, so you simply raise the base, which is the number itself, to the power of the exponent:

1^4 = 1
2^3 = 8
(-6)^3 = -216
5^3 = 125

Therefore, the standard forms are 1, 8, -216, and 125 respective to each example.