For any three positive real numbers a ,b and c `9(25a^(2)+b^(2)) + 25 (c^(2)-3ac) `= 15 b (3a +c ) . Then

If three positive real numbers a, b, c are in A.P. such that abc = 4, then the minimum value of b is

If a, b and c are distinct reals and the determinant |{:(a ^(3) +1, a ^(2) , a ),( b ^(3) +1, b ^(2) , b ),( c ^(3) +1, c ^(2), c):}|= 0, then the product abc is

The equation a cos theta + b sin theta = c has a solution when a,b and c are real numbers such that : a) a lt b lt c b) a = b=c c) c ^(2) lea ^(2) + b ^(2) d) c ^(2) le a ^(2) -b ^(2)

If a, b, c, d and p are different real numbers such that (a^2+b^2+c^2).p^2-2(ab+b c+cd) p +(b^2+c^2+d^2) le 0 , then show that a, b, c and d are in G.P .

Write each of these as powers of different numbers. a) 3^3 b) 4^6 c) 2^15 d) 5^12

If c lt 1 and the system of equations x + y - 1 = 0, 2x - y - c = 0 and -bx + 3by - c = 0 is consistent, then the possible real values of b are a) b in (-3,(3)/(4)) b) b in (-(3)/(2),4) c) b in (-(3)/(4),3) d)None of these