Prove that all the normals to the curve ...

Prove that all the normals to the curve `x=a cost+ at sint` and `y=a sint-at cost` are at a distance 'a' from the origin `(a in R^+)`.

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Prove that all normals to the curve x=acost+a tsint ,\ \ y=asint-a tcost are at a distance a from the origin.

Prove that all normals to the curve x=acost+a tsint ,\ \ y=asint-a tcost are at a distance a from the origin.

Slope of the normal to the curve x=a(t+sint),y=a(t-sint) is

The length of the normal at pon the curve x=a(t+sint),y=a(1-cost) is

The distance from the origin of the normal to the curve x=2cos t+2tsint , y=2sint-2tcost , at t=(pi)/4 is

x = a (cost + t sint) , y = a (sint - tcost) find (dy)/(dx) .

If x = a(cost + t sint) and y = a(sint - tcost) , find (d^2y)/dx^2

If x=a(cost+tsint) and y=a(sint-tcost) , find (d^2y)/(dx^2)

If x=a(cost+tsint) and y=a(sint-tcost) , find (d^2y)/(dx^2)

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