Question

$\sqrt[3]{99 + 88}$
Answer this question ​

Answer 1

Answer:

Step-by-step explanation:

³√99 + 88

= ³√( 9 × 11) + ( 8 × 11)

= ³√ 11 ( 9 + 8 )

= ³√11 ( 17 )

= ³√ 187

=

Answer 2

Given:

$\sqrt[3]{99+ 88}$

Solution:

⇒ $\sqrt[3]{99+ 88}$

⇒$\sqrt[3]{(9*11) + (8*11)}$

             now, take 11 common

⇒ $\sqrt[3]{11(9+ 8)}$

⇒ $\sqrt[3]{11*17)}$

⇒$\sqrt[3]{197}$

⇒ 5.819 or $197^{1/3}$

Therefore, the cube root of 197 is 5.819

cube root of 197 in exponential form is $197^{1/3}$

and cube root of 197 in radical form is $\sqrt[3]{197}$.