Question 1166275
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Find the slope of the curve x^2+2y^2-3x-4y+2=0 at (1,2)
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First, you should check that the given point (1,2) lies on the curve,
i.e. satisfies the equation.


It does satisfy, so this part is Ok.


Next, differentiate implicitly

    2x*dx + 4y*dy -3*dx - 4*dy = 0.    (1)


Here dx and dy are linear elements; x and y are parameters (coordinate values of points on the curve).


In equation (1), substitute the values  x= 1, y= 2 for the given point. You will get then

    2*1*dx + 4*2*dy - 3*dx - 4*dy = 0,  or


   2*dx    + 8*dy   - 3*dx - 4*dy,

    -dx    + 4*dy = 0

    4*dy          = dx

    {{{dy/dx}}}   = {{{1/4}}}


<U>ANSWER</U>.  The slope of the tangent to the curve  x^2+2y^2-3x-4y+2=0  at  (1,2)  is  {{{1/4}}}.
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Solved.