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Question

How can you use polynomial identities to factor polynomials and simplify numerical expressions ?
$open parentheses 9 m to the power of 4 close parentheses minus open parentheses 25 n to the power of 6 close parentheses$

The correct answer is: Factorization of polynomial of higher degree can be done by polynomial identities. This is used to reduce time and space.

ANSWER:
Hint:
$a squared minus b squared equals left parenthesis a plus b right parenthesis left parenthesis a minus b right parenthesis$ , where a and b can be real numbers, variables or multiples of both.
We are asked to factorize the given expression using a polynomial identity.
Step 1 of 2:
Here, the given expression is $open parentheses 9 m to the power of 4 close parentheses minus open parentheses 25 n to the power of 6 close parentheses$ .
It can be written as: $open parentheses 3 m squared close parentheses squared minus open parentheses 5 n cubed close parentheses squared$ , where $a equals 3 m squared straight & b equals 5 n cubed$ .
Step 2 of 2:
Apply the polynomial identity $a squared minus b squared equals left parenthesis a plus b right parenthesis left parenthesis a minus b right parenthesis$ to factorize the expression $open parentheses 3 m squared close parentheses squared minus open parentheses 5 n cubed close parentheses squared$ .
$open parentheses 9 m to the power of 4 close parentheses minus open parentheses 25 n to the power of 6 close parentheses equals open parentheses 3 m squared close parentheses squared minus open parentheses 5 n cubed close parentheses squared$
$equals open parentheses 3 m squared minus 5 n cubed close parentheses open parentheses 3 m squared plus 5 n cubed close parentheses$
Hence, the answer is: $open parentheses 3 m squared minus 5 n cubed close parentheses open parentheses 3 m squared plus 5 n cubed close parentheses$ .
Note:
Factorization of polynomial of higher degree can be done by polynomial identities. This is used to reduce time and space.

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