(q^4)^z=q^12 find the value of z

Question

asked Jan 27, 2021 156k views

2 Answers

Tarod · Answer 1 · 2021-01-28T08:06:23+0000

Answer:

The value of z is 3.

Explanation:

You have to use Indices Law,

${( {a}^(m)) }^(n) \: ⇒ \: {a}^(mn)$

So for this question, first you have to get rid of brackets :

${ ({q}^(4) )}^(z) = {q}^(12)$

${q}^(4z) = {q}^(12)$

Next you can solve it since both have the same bases :

${q}^(4z) = {q}^(12)$

Karthik Saxena · Answer 2 · 2021-02-01T12:37:20+0000

Answer:

z = 3

Explanation:

Using the rule of exponents

(a^(m)) ^(n) =
a^(mn)

Thus

(q^(4)) ^(z) =
q^(4z) , so

q^(4z) =
q^(12)

Since the bases on both sides are equal then equate the exponents

4z = 12 ( divide both sides by 4 )

z = 3