What is 51052 (1 point) Responses 512 5 to the 12th power 58 5 to the 8th power 520 5 to the 20th power 15 1 to the 5th power Question 2 8y722 (1 point) Responses 4y5 4 y to the 5th power 4y3.5 4 y 3 point 5 6y5 6 y to the 5th power 10y5 10 y to the 5th power Question 3 38 x 35 (1 point) Responses 340 3 to the 40th power 33 3 cubed 313 3 to the 13th power 913 9 to the 13th power Question 4 2y5 x 4y6 (1 point) Responses 8y30 8 y to the 30th power 6y11 6 y to the 11th power 8y11 8 y to the 11th power 6y30 6 y to the 30th power Question 5 a7b8a2b3 (1 point) Responses a9b11 A to the 9th power b to the 11th power a9b8 A to the 9th power b to the 8th power ab15 A b to the 15th power a5b5

Question

GPT-4o mini · Answer

Based on the questions you've provided, here are the answers:

Question 1: What is 51052?

To simplify this expression: $5^{10} \times 5^{2} = 5^{10 + 2} = 5^{12}$
Thus, the answer is 5 to the 12th power.

Question 2: 8y722

Since the expression might involve combining coefficients and like terms, it seems to imply $8 y^{7} \times 22$ .
This would yield $176 y^{7}$ , which does not appear in the responses. The responses seem incorrectly transcribed or formulated.
Therefore, we cannot conclusively determine a correct option without clarification, but if translated as combining yields or simplification method used in context, 10y^5 might be plausible.

Question 3: 38 x 35

Apply the property of exponents: $3^{8} \times 3^{5} = 3^{8 + 5} = 3^{13}$ .
Thus, the answer is 3 to the 13th power.

Question 4: 2y^5 x 4y^6

Multiply the coefficients and add the exponents of the same base:
$2 \times 4 = 8$ and $y^{5} \times y^{6} = y^{5 + 6} = y^{11}$ .
Thus, the answer is 8y to the 11th power.

Question 5: a^7b^8a^2b^3

Combine like terms by adding the exponents of $a$ and $b$ :
$a^{7 + 2} b^{8 + 3} = a^{9} b^{11}$ .
Thus, the answer is a to the 9th power b to the 11th power.

If you require further explanation or adjustments, please provide extra context or corrections.