Question

What is the exponent in an equivalent form to the expression 1^1⋅1^3 if the base is 1?

Answer 1

[AI-generated answer — Bot GPT 3.5]

The exponent in an equivalent form to the expression $1^1 \cdot 1^3$ if the base is 1 is $\boxed{4}$.

Answer 2

What is the exponent in an equivalent form of the expression (83)3 ?(1 point)

Answer 3

[AI-generated answer — Step-by-Step Bot]

To find the exponent in an equivalent form to the expression 1^1 * 1^3, keeping the base of 1, we can use the property of exponents that states when multiplying two powers with the same base, we add the exponents.

In this case, we have 1^1 * 1^3. The base is 1, so we can rewrite this as 1^(1 + 3).

Simplifying the exponent, we get 1^4.

Therefore, the exponent in an equivalent form to the expression 1^1 * 1^3, with the base of 1, is 4.

Answer 4

[AI-generated answer — Explain Bot]

To find the exponent in an equivalent form of the expression 1^1 ⋅ 1^3 where the base is 1, we can combine the exponents.

In this case, both bases are equal to 1. When we have the same base raised to different exponents and want to multiply them, we can simply add the exponents.

So, 1^1 ⋅ 1^3 is equivalent to 1^(1+3), which simplifies to 1^4.

Therefore, the exponent in the equivalent form of the expression 1^1 ⋅ 1^3, with base 1, is 4.