Equation of the tangent line at y=a/4 to the curve y(x^2+a^2)=ax^2 is...
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d/dx (x2 + xy + y2) = d/dx 3 = 0
Break the left side into separate terms
d/dx (x2) = 2x
d/dx (xy) = x dy/dx + y dx/dx = x dy/dx + y
d/dx (y2) = 2y dy/dx
So the whole left side is:
2x + x dy/dx + y + 2y dy/dx, which equals 0
Gather terms and solve for dy/dx:
x dy/dx + 2y dy/dx = -2x -y
dy/dx (x + 2y) = - (2x + y)
dy/dx= - (2x + y) / (x + 2y)
Plug the point (1,1) into the expression for dy/dx:
dy/dx= - (2 + 1) / (1 + 2) = -3/3 = -1
Now you know the slope of the tangent line at (1,1). From that you can find the equation for the line.
Break the left side into separate terms
d/dx (x2) = 2x
d/dx (xy) = x dy/dx + y dx/dx = x dy/dx + y
d/dx (y2) = 2y dy/dx
So the whole left side is:
2x + x dy/dx + y + 2y dy/dx, which equals 0
Gather terms and solve for dy/dx:
x dy/dx + 2y dy/dx = -2x -y
dy/dx (x + 2y) = - (2x + y)
dy/dx= - (2x + y) / (x + 2y)
Plug the point (1,1) into the expression for dy/dx:
dy/dx= - (2 + 1) / (1 + 2) = -3/3 = -1
Now you know the slope of the tangent line at (1,1). From that you can find the equation for the line.
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