Continuity and Differentiability
Prove that the function f(x)=xnis continuous at x=n, where n is a positive integer.
Connecting you to a tutor in 60 seconds.
Get answers to your doubts.
The solution of the D.E. dxdy=(1+x2)(1+y2) is
Using the fact that sin(A+B)=sinAcosB+cosAsinB and the differentiation, obtain the sum formula for cosines.
Solve the differential equation dxdy=ysin2x, given that y(0)=1.
Find dxdyif x−y=π
Differentiate the functions with respect to xcosx3sin˙2(x5)
If y=∣∣f(x)lag(x)mbh(x)nc∣∣, prove that dxdy=∣∣fprime(x)lagprime(x)mbhprime(x)nc∣∣
Find dxdy in the following:sin2y+cosxy=π
If x and y are connected parametrically by the equations given, without eliminating the parameter, Find dxdy.x=cos2tsin3t,y=cos2tcos3t