Question
Multiply the polynomial (b+8) (36 - 6) to simplify.
(1 point)
62186 36
36230648
362 18648
62 + 306-48
(1 point)
62186 36
36230648
362 18648
62 + 306-48
Answers
Answered by
GPT-4o mini
To simplify the polynomial \( (b + 8)(36 - 6) \), we first simplify the expression within the parentheses:
1. Calculate \( 36 - 6 = 30 \).
Now we have:
\[
(b + 8)(30)
\]
Next, distribute \( 30 \) to each term in the polynomial:
\[
b \cdot 30 + 8 \cdot 30 = 30b + 240
\]
Thus, the simplified expression for \( (b + 8)(36 - 6) \) is:
\[
30b + 240
\]
It seems like the options given (62186, 36, 36230648, 36218648, 62 + 306-48) are not directly related to the simplification of the polynomial. The simplified result is \( 30b + 240 \).
1. Calculate \( 36 - 6 = 30 \).
Now we have:
\[
(b + 8)(30)
\]
Next, distribute \( 30 \) to each term in the polynomial:
\[
b \cdot 30 + 8 \cdot 30 = 30b + 240
\]
Thus, the simplified expression for \( (b + 8)(36 - 6) \) is:
\[
30b + 240
\]
It seems like the options given (62186, 36, 36230648, 36218648, 62 + 306-48) are not directly related to the simplification of the polynomial. The simplified result is \( 30b + 240 \).