Find the `t_2` of the following sequence for which `S_1 = 2,S_2 = 12 and S_3 = 36` A)24 B)2 C)10 D)none of these

If S_1a n dS_2 are the foci of the hyperbola whose length of the transverse axis is 4 and that of the conjugate axis is 6, and S_3a n dS_4 are the foci of the conjugate hyperbola, then the area of quadrilateral S_1S_3S_2S_4 is 24 (b) 26 (c) 22 (d) none of these

Let {t_n} be a sequence of integers in G.P. in which t_4: t_6=1:4a n dt_2+t_5=216. . Then t_1i s 12 b. 14 c. 16 d. none of these

Find the derivative of s = sec(3t + 2) .

If P S Q is a focal chord of the parabola y^2=8x such that S P=6 , then the length of S Q is (a)6 (b) 4 (c) 3 (d) none of these

The sum of first n terms of an A.P. S_n = …..A) n/2 [ t_1 + t_n] B) n/2 [a+(n-1)d] C) n/2 [2 + (n-1)d] D)none of these

If the normals to the parabola y^2=4a x at three points P ,Q ,a n dR meet at A ,a n dS is the focus, then S PdotS qdotS R is equal to a^2S A (b) S A^3 (c) a S A^2 (d) none of these

Consider the sequence of natural numbers s_0,s_1,s_2 ,... such that s_0 =3, s_1 = 3 and s_n = 3 + s_(n-1) s_(n-2) , then

Consider the arrangement shownin figure. By some mechanism,the separation between the slits S_3 and S_4 can be changed. The intensity in measured at the point P which is at the common perpendicular bisector of S_1S_2 and S_3S_4. When z=(Dlamda)/(2d) the intensity measured at P is I. Find this intensity when z is equal to a. (Dlamda)/d, b. (3Dlamda)/(2d), c. (2Dlamda)/d