give 2 examples to prove that a^m= b^m where a is not equal to b.
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Step-by-step explanation:
Examples:
Let 'm' be 2
Let 'a' be 1 and 'b' be -1
Here 'a' is not equal to 'b' as 1 ≠ -1
But 1^2 = (-1)^2
Therefore even if a ≠ b
a^m=b^m.
Similarly 2^2=(-2)^2.
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