5) Find the equation of the tangent line to y^2 - 2x

Transcript

00:01 Hello, we have to find the equation of the tangent for this given equation of the graph at the point with the given value of x equals to 1.

00:13 X, y, square, this is the equation of the equation of the graph and the point x equals to 1.

00:23 So, y square minus y minus 2 equals to 0.

00:27 So it will be equal to y square minus 2 y plus y minus 2 equals to 0.

00:39 Y minus 2 plus 1 y minus 2 equals to 0 so y plus 1 y minus 2 equals to 0 by equals to minus 1 and 2 this the point are 1 comma minus 1 and 1 comma 2 okay these are the points these are the points okay so now we have to find that tangent line for this we need a slope of this slope for this slope for the tangent line so that is d y by d x at the given point so first we will calculate the d by d x by d by x by the given equation with respect to x so we will differentiate this equation with respect to x it will be differentiating the given equation with respect to x so it will be 2 y x d y x d y x plus y square minus of d y by d x equals to 0 so we can add 2 y x minus 1 d y upon d x plus y square equals to 0 so d y upon d x will be equal to y square 1 minus 2 x y so we can add the slope of the tangent line slope m1 that is d y by d x at the given point 1 comma minus 1 and 1 comma 2 so it will be close to 1 minus 1 whole square 1 minus 2 into 1 into minus 1 so it will be 1 upon 1 plus 2 that is equals to 1 upon 3 so that is 2 square 1 minus 2 of x and y so that is 4 upon 1 minus 4 that is minus 4 upon 3 that is minus 4 upon 3 okay these are are the slopes so we can write the equation of the tangent at point x1 and y1 and slope is m so it will be y minus y1 equals to m into x minus x1 so the point point is one common as one and the slope is at this point will be 1 by 3 the equation we can write x minus 1 so it will be y plus 1 equals to x y 3 minus 1 y 3 so equation of the tangent will be x y 3 minus 1 by 3 minus 1 so that is equal to y upon by equals to x y 3 minus 4 upon 3 this is the equation of the tangent okay and for the point b b point is 1 comma 2 and the slope is minus 4 comma 3 minus 4 y 3 this is the slope 4 y 3 minus 4 y 3 and 1 comma 2 equation of the tangent will be y minus 2 equals to minus 4 upon 3 x minus 1 1 minus 2 equals to minus 4 y 3 x plus 4 y 3 x plus 4 y 3 plus 2 so by 3 x plus 4 y 3 plus 2 so by will be equals to minus of 4 y 3 x plus 10 y 3 3 this is the equation of the tangent at the point b...

Question

5) Find the equation of the tangent line to $y^2 - 2x - 4y - 1 = 0$ at the point $(-2, 1)$

Question

5) Find the equation of the tangent line to $y^2 - 2x - 4y - 1 = 0$ at the point $(-2, 1)$

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