anonymous
  • anonymous
really need help Find the inverse of the function. f(x) = the cube root of quantity x /8. - 4
Precalculus
  • Stacey Warren - Expert brainly.com
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SOLVED
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schrodinger
  • schrodinger
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anonymous
  • anonymous
as an example: \[ if f(x) = \sqrt[3]{x}\] Then the inverse would be \[x^3 \] So if f(x) is the cube root of (x/8-4) then the inverse is (x/8-4)^3
anonymous
  • anonymous
f-1(x) = [8(x + 4)]3 f-1(x) = 8(x + 4)3 f-1(x) = 8(x3 + 4) f-1(x) = 24(x + 4)
anonymous
  • anonymous
thts not in my answer choice

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anonymous
  • anonymous
I'm not sure, I think i'm missing something.
anonymous
  • anonymous
ok can you help me withthis
anonymous
  • anonymous
Describe how to transform the graph of f into the graph of g. f(x) = square root x-8. and g(x) = square root of quantity x+4.
anonymous
  • anonymous
I'm not sure if this is the right form, because it's been awhile since I did this, but it's basically f(x+12) Because f(x+12) = sqrt( (x+12) - 8) = sqrt(x+4) = g(x)

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