Let `Delta=|{:(a,a+d,a+3d),(a+d,a+2d,a),(a+2d, a, a+d):}|` then :

If |(a,a +d,a +2d),(a^(2),(a + d)^(2),(a + 2d)^(2)),(2a + 3d,2 (a +d),2a +d)| = 0 , then

let a > 0 , d > 0 find the value of the determinant |[1/a,1/(a(a + d)),1/( (a + d) (a +2d))],[1/(a+ d),1/( (a+ d) (a + 2d)), 1/((a+2d) (a + 3d))],[1/(a +2d), 1/((a + 2d) (a +3d)), 1/((a+3d) (a + 4d))]|

Let D_1=|[a, b, a+b], [c, d, c+d], [a, b, a-b]| and D_2=|[a, c, a+c], [b, d, b+d], [a, c, a+b+c]| then the value of |(D_1)/(D_2)| , where b!=0 and a d!=b c , is _____.

If "Delta"_1=|x bb a x b a a x|a n d"Delta"_2=|x b a x| are the given determinants, then "Delta"_1=3("Delta"_2)^2 b. d/(dx)("Delta"_1)=3"Delta"_2 c. d/(dx)("Delta"_1)=3("Delta"_2)^2 d. "Delta"_1=3"Delta"2 3//2

Let A and B be two sets such that n(A)=5\ a n d\ n(B)=2,\ if\ a ,\ b ,\ c ,\ d ,\ e are distinct and (a ,2),\ (b ,3),\ (c ,2),\ (d ,3),\ (e ,2) are in AxxB , find A and B.

The standard deviation of a, a+d, a + 2d,….a + 2nd is

Let D_1=|a b a+b c d c+d a b a-b|a n dD_2=|a c a+c b d b+d a c a+b+c| then the value of |(D_1)/(D_2)|,w h e r eb!=0a n da d!=b c , is _____.

Let A = [(1,0),(2,3)] and A^(n) = [(a, b),(c,d)] then lim_(n to oo) (b + c)/(a + d) =

If the area of each plate is A and then successive separations are d, 2d and 3d , then find the equivalent capacitance across A and B. .

Let d in R, and A[{:(,-2,4+d,(sin theta-2)),(,1,(sin theta)+2,d),(,5,(2sin theta)d,(-sin theta)+2+2d):}]=theta in [0,2pi] If the minimum value of det(A) is B. Then the value of d is: