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The approximation of \(\log _{3}(\sqrt{2})\)

  1. Use linear approximation, i.e. the tangent line, to approximate sqrt[3] { 8.4 } as follows:Let f(x) = sqrt[3] x. The equation of
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    2. Ben asked by Ben
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  2. find the linear approximation to square root(a+x) for x near o. a is a constant (pos.) L(x)= sqrt(a)+1/2(a+0)^-1/2 (x-0) is this
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    2. Anonymous asked by Anonymous
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  3. Use linear approximation, i.e. the tangent line, to approximate \sqrt[3] { 7.9 } as follows:The equation of the tangent line to
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    2. Ashley asked by Ashley
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  4. Use a linear approximation (or differentials) to estimate the given number.sqrt(99.6) so i think i start with f(x)=sqrt(100-x)
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    2. kirsten asked by kirsten
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  5. find the bound on the magnitude of the error if we approximate sqrt 2 using the taylor approximation of degree three for sqrt
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    2. tony asked by tony
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  6. Solve the question for both the exact irrational root and its rational approximation to the nearest tenth 3h + sqrt 2 = sqrt 5
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    2. april asked by april
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  7. Solve the question for both the exact irrational root and its rational approximation to the nearest tenth. sqrt 2 over 3 s + 1 =
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    2. april asked by april
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  8. Find the linear approximation of the function.g(x) = ^3sqrt(1 + x) at a = 0. g(x)≈ Use to approximate these numbers (round to
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    2. Q asked by Q
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  9. Let f(x) = \sqrt[3] x. The equation of the tangent line to f(x) at x = 8 is y = (1/12)(x-8)+2. Using this, we find our
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    2. Anonymous asked by Anonymous
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  10. Let f(x) = \sqrt[3] x. The equation of the tangent line to f(x) at x = 125 is y = . Using this, we find our approximation for
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    2. Alessandra Romano asked by Alessandra Romano
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