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рдкреНрд░рд╢реНрди
Evaluate:
`(2^(n + 2) + 2^n)/(2^(n + 2) - 2^(n + 1))`
рдореВрд▓реНрдпрд╛рдВрдХрди
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рдЙрддреНрддрд░
Given expression is `(2^(n + 2) + 2^n)/(2^(n + 2) - 2^(n + 1))`,
Using the laws of exponents that is `a^(n + m) = a^n xx a^m` we get,
= `(2^n xx 2^2 + 2^n)/(2^n xx 2^2 - 2^n xx 2^1)`
Now, taking out the common term and simplifying the expression by cancelling out the same term we get,
= `(2^n xx 2^2 + 1)/(2^n xx (2^2 - 2))`
= `(2^2 + 1)/(2^2 - 2)`
= `(4 + 1)/(4 - 2)`
= `5/2`
Therefore, the value of `(2^(n + 2) + 2^n)/(2^(n + 2) - 2^(n + 1)) = 5/2`.
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