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For the graph of cos(y)=x-4y, what is the range of the slopes of its tangent lines?
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For the graph of cos(y)=x-4y, what is the range of the slopes of its tangent lines?

User Zephyrthenoble
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1 Answer

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Any tangent line to the curve has a slope given by
(\mathrm dy)/(\mathrm dx).


\cos y=x-4y\implies-\sin y\,(\mathrm dy)/(\mathrm dx)=1-4\,(\mathrm dy)/(\mathrm dx)


\implies(\mathrm dy)/(\mathrm dx)=\frac1{4-\sin y}

Since
|\sin y|\le1, the denominator ranges from 3 to 5, so the range of slopes is
\frac15\le(\mathrm dy)/(\mathrm dx)\le\frac13.

User Davide ND
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