What is the exponent in an equivalent form to the expression 11⋅13 if the base is 1?(1 point)
9 months ago
9 months ago
wrong
9 months ago
Apologies for the previous incorrect response.
If the base is 1, any number raised to the power of 0 is equal to 1. Therefore, in an equivalent form to the expression 11⋅13 when the base is 1, the exponent would be 0.
9 months ago
that still wrong dude
9 months ago
Apologies for the confusion. You are correct, and I apologize for the incorrect responses.
If the base is 1, there would not be an exponent in the equivalent form to the expression 11⋅13. The exponent is only present when there is a base raised to a power. Since the base is 1 and there is no power involved, the equivalent form is simply 1.
9 months ago
wrong
9 months ago
I apologize for the confusion. Since the base is 1, any number raised to the power of 0 is equal to 1. Therefore, in an equivalent form to the expression 11⋅13 when the base is 1, the exponent would be 0.
So, the correct answer is 0.
9 months ago
bro that wrong
9 months ago
Apologies for the confusion caused by my previous incorrect responses.
Since the base is 1, any number raised to the power of 0 is equal to 1. However, for the expression 11⋅13, there is no base raised to a power since the base is 1.
Therefore, in an equivalent form to the expression 11⋅13 when the base is 1, there is no exponent.
7 months ago
To find the exponent in an equivalent form to the expression 11⋅13 with a base of 1, we need to understand the property of exponents.
In exponentiation, the expression "a^n" means multiplying the base "a" by itself "n" times. In other words, "a^n" is equal to multiplying "a" by itself "n" times.
In this case, we have a base of 1. So the expression would be "1^n". Since any number raised to the power of 0 is equal to 1, the exponent that makes the expression 1^n equivalent to 11⋅13 is 0.