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How can $(2^{100}-2^{98})(2^{99}-2^{97})$ be written in terms of its prime factors?

How can $(2^{100}-2^{98})(2^{99}-2^{97})$ be written in terms of its prime factors? I tried to expand it: $2^{199}-4^{197}+2^{195}$ What do I do next? The answer choices are: A. $2^{100}\cdot3 \...

BlueMagic1923

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asked Jan 11, 2017 at 23:35

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How can $(2^{100}-2^{98})(2^{99}-2^{97})$ be written in terms of its prime factors?

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How can $(2^{100}-2^{98})(2^{99}-2^{97})$ be written in terms of its prime factors?

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