Question

The multiplicative inverse of

(–⅝)^–99 is:

(a) (–⅝)^–99

(b) (⅝)^–99

(c) (–8/5)^–99

(d) (9/5))^99​

Answer 1

Answer:

The multiplicative inverse of expression is \frac{9^{-99}}{-5}

−5

9

−99

Step-by-step explanation:

Given : Expression \frac{-5}{9^{-99}}

9

−99

−5

To find : What is the multiplicative inverse of expression ?

Solution :

Multiplicative inverse is x reciprocate to \frac{1}{x}

x

1

.

Let x=\frac{-5}{9^{-99}}x=

9

−99

−5

The multiplicative inverse is

\frac{1}{x}=\frac{1}{\frac{-5}{9^{-99}}}

x

1

=

9

−99

−5

1

\frac{1}{x}=\frac{9^{-99}}{-5}

x

1

=

−5

9

−99

Therefore, the multiplicative inverse of expression is \frac{9^{-99}}{-5}

−5

9

−99

Answer 2

Answer:

(9/5))^99 this is the correct answer