formula of 1-sinx

Find the radius of curvature at (a,a/2) on the curve 4ay^{2} = (2a - x )^{3.}

if for a matrix A , A to the power 5 = I , THEN A inverse =

what is the value of e raised to infinity ?

Possible values of thita for which the point (cos thita, sin thita ) lies inside the triangle formed by lines x+y=2, x-y=1 and 6x+2y=square root of 10 are _

formula of 1-sinx

^{-1 }(1/2)}Find the radius of curvature at (a,a/2) on the curve 4ay

^{2}= (2a - x )^{3.}integrate e^ mod x where x lies between -1,1

if for a matrix A , A to the power 5 = I , THEN A inverse =

_{7}= {1,2,3,4,5,6,7}, does the following partitions give rise to an equivalence relation? Why?A

_{1}={1,2,5,7}, A_{2}={3}, A_{3}={4,6}.^{-1}(1/x)=cot^{-1}x holdswhat is the value of

eraised to infinity ?Q.21. Find the value of $\theta in\left[0,2\mathrm{\pi}\right]$ such that the matrix $\left[\begin{array}{ccc}2\mathrm{sin}\theta -1& \mathrm{sin}\theta & \mathrm{cos}\theta \\ \mathrm{sin}\left(\theta +\pi \right)& 2\mathrm{cos}\theta -\sqrt{3}& \mathrm{tan}\theta \\ \mathrm{cos}\left(\mathrm{\theta}-\mathrm{\pi}\right)& \mathrm{tan}\left(\mathrm{\pi}-\mathrm{\theta}\right)& 0\end{array}\right]$ is a skew symmetric matrix.

Possible values of thita for which the point (cos thita, sin thita ) lies inside the triangle formed by lines x+y=2, x-y=1 and 6x+2y=square root of 10 are _