How do you simplify #(- 7) ^ { 4} \cdot ( - 3) ^ { 4} #?

2 Answers
Sep 21, 2017

#(-7)^4 cdot (-3)^4#

Explanation:

The question asked is same thing as the answer..

It can't be simplified any more, except if you want to Evaluate the answer..

#(-7)^4 cdot (-3)^4# is in it's simplest term, where it can't be simplified any longer.

But if they would have been same base of numbers (same set of digits), they it can be simplified as only one value..

For example, if we would have #-3^a cdot -3^a# then it would have been simplified as #9^(a+a)# where #a# represent any integer..

Sep 22, 2017

#194481#

Explanation:

#(-7)^4=(-7)xx(-7)xx(-7)xx(-7)#

#color(white)((-7)^4)=49xx49=2401#

#(-3)^4=(-3)xx(-3)xx(-3)xx(-3)#

#color(white)((-3)^4)=9xx9=81#

#rArr(-7)^4 .(-3)^4#

#=2401xx81#

#=194481#