What is the value of 4^{10} * 8^{20} * 16^4? Express your answer in the form a^b, where a and b are positive integers such that a is the least possible positive integer.
What is the value of 4^{10} * 8^{20} * 16^4?
Hello Guest!
\({\color{blue}4^{10} \cdot8^{20} \cdot 16^4}=2^{2\cdot 10}\cdot2^{3\cdot 20}\cdot 2^{4\cdot 4}=2^{20+60+16}\color{blue}=2^{96}\)
\(=79228162514264337593543950336\) !
$$4^{10} = 2^{2*10}. Apply \ all \ of \ this, \ and \ it \ will \ equal \ YOURFACE.$$
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