Answer :
Step-by-step explanation:
It seems there is a bit of confusion or a typo in the expression you provided. Let's clarify and solve the equation you mentioned:
Given:
\[ x = 2.56^{4^{2}} = 10 \]
First, evaluate \( 4^2 \):
\[ 4^2 = 16 \]
Now substitute this back into the expression for \( x \):
\[ x = 2.56^{16} \]
You mentioned \( x = 10 \), but this does not match the original expression \( 2.56^{16} \). To find the correct value of \( x \), we need to calculate \( 2.56^{16} \):
\[ 2.56 = \frac{256}{100} = \left(\frac{256}{100}\right)^{16} = \left(\frac{256}{100}\right)^{16}