Find an equation of the tangent line to the curve cos(x) + 10y² = xy? + 31 at the point (0, ?3). Assume that y is a function of x. Express all numbers in exact form and write the equation of the tangent line in terms of x and y. equation:
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To do this, we use the slope of the curve cos(x) I0y and solve for y: y = -32x + 9 Now we need to find the equation of the tangent line at (0,0). To do this, we use the slope of the tangent line t0 and solve for x: x = -32t0 + 9 Show more…
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