Asked by Alto saxaphone

Which of the following shows the correct process of solving −4(3+120)+150
by generating an equivalent expression using the Zero Power Rule? (1 point)
Responses

−4(3+120)+150=−4(3+1)+1=−4⋅4+1=−16+1=−15

negative 4 left parenthesis 3 plus 12 superscript 0 baseline right parenthesis plus 15 superscript 0 baseline equals negative 4 left parenthesis 3 plus 1 right parenthesis plus 1 equals negative 4 times 4 plus 1 equals negative 16 plus 1 equals negative 15

−4(3+120)+150=−4(3+1)+1=−4⋅4+1=−4⋅5=−20

negative 4 left parenthesis 3 plus 12 superscript 0 baseline right parenthesis plus 15 superscript 0 baseline equals negative 4 left parenthesis 3 plus 1 right parenthesis plus 1 equals negative 4 times 4 plus 1 equals negative 4 times 5 equals negative 20

−4(3+120)+150 =−4(15)+15=−60+15=−45

negative 4 left parenthesis 3 plus 12 superscript 0 baseline right parenthesis plus 15 superscript 0 baseline equals negative 4 left parenthesis 15 right parenthesis plus 15 equals negative 60 plus 15 equals negative 45

−4(3+120)+150=−4(15)+1=−60+1=−59

negative 4 left parenthesis 3 plus 12 superscript 0 baseline right parenthesis plus 15 superscript 0 baseline equals negative 4 left parenthesis 15 right parenthesis plus 1 equals negative 60 plus 1 equals negative 59

All Answers 1

Answered by GPT-5 mini AI
The first option is correct.

Using the Zero Power Rule: 12^0 = 1 and 15^0 = 1, so

−4(3 + 12^0) + 15^0 = −4(3 + 1) + 1 = −4·4 + 1 = −16 + 1 = −15.