If `t_n=1/4(n+2)(n+3)` for `n=1,2,3, ,` then `1/(t_1)+1/(t_2)+1/(t_3)++1/(t_(2003))=`

If x=a t^2,\ \ y=2\ a t , then (d^2y)/(dx^2)= -1/(t^2) (b) 1/(2\ a t^3) (c) -1/(t^3) (d) -1/(2\ a t^3)

The base of a triangle is divided into three equal parts. If t_1, t_2,t_3 are the tangents of the angles subtended by these parts at the opposite vertex, prove that (1/(t_1)+1/(t_2))(1/(t_2)+1/(t_3))=4(1+1/(t_2)^ 2))dot

If sum_(r=1)^n t_r=n/8(n+1)(n+2)(n+3), then find sum_(r=1)^n1/(t_r)dot

Find the sum of first 24 terms of on AP t_(1),t_(2),t_(3),"....", if it is known that t_(1) + t_(5) + t_(10) + t_(15) + t_(20) + t_(24)=225.

The velocity-time graph of particle in one dimensional motion is shown in the fig. Which if the following formulae are correct for describing the motion of the pawrticle over the time interval t_1 to t_2 v(t_2) = v(t_1) + a(t_2 - t_2) , v_(average) = ([x(t_2) - x(t_1)])/((t_2 - t_1)) , x(t_2) - x(t_1) = area under the v - t curve. bounded by the t-axis and the dotted line shown.

If y=(1+t a n A)(1-t a n B), where A-B=pi/4, then (y+1)^(y-1) is equal to 9 (b) 4 (c) 27 (d) 81

If g(t) = 1- 4t^2 , find g’(1).

If t_(1)=1,t_(r )-t_( r-1)=2^(r-1),r ge 2 , find sum_(r=1)^(n)t_(r ) .

Prove the following by using the principle of mathematical induction for all n in N :- 1/(1.2.3)+1/(2.3.4)+1/(3.4.5)+...+1/(n(n+1)(n+2))=(n(n+3))/(4(n+1)(n+2)) .

Find dy/dx at t = 2 when x = (2bt)/(1+t^2) and y = (a(1-t^2))/(1+t^2)