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14 October, 01:54

Let f (x) = 2 (3) ^x+1 + 4.

The graph of f (x) is stretched vertically by a factor of 2 to form the graph of g (x).

What is the equation of g (x) g (x) ?

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  1. 14 October, 05:38
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    If f is strectced vertically by a factor of 2 to form g (x) then the eqn takes the form g (x) = 2 f (x). Here f (x) = 2 (3) ^ (x + 1) + 4. This gives us 2 (2 (3) ^ (x + 1) + 4). So we have g (x) = 4 (3) ^ (x + 1) + 8. g (x) g (x) = (4 (3) ^ (x + 1) + 8) * (4 (3) ^ (x+1) + 8). This gives us 16 (3) ^2 (x + 1) + 32 (3) ^ (x + 1) + 32 (3) ^ (x + 1) + 16 (3) ^2 (x + 1). Then we have 16 (3) ^ (2x + 2) + 64 (3) ^ (x + 1) + 16 (3) ^ (2x+2). So our final answer is 32 (3) ^ (2x + 2) + 64 (3) ^ (x + 1)
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