Minimum value of `(b+c)/(a) +(c+a) /(b) + (a+b)/(c )` ( for real positive numbers a,b,c ) is

If (a)/(b+c),(b)/(c+a),(c)/(a+b) are in AP, then

If (b+c-a)/a,(c+a-b)/b,(a+b-c)/c are in A.P, prove that 1/a,1/b,1/c are also A.P.s

If a and b are positive numbers such that a gt b , then the minimum value of a sec theta- b tan theta (0 lt theta lt pi/2) is a) 1/sqrt(a^2-b^2) b) 1/sqrt(a^2+b^2) c) sqrt(a^2+b^2) d) sqrt(a^2-b^2)

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 (b + c) (y + z) - ax = b - c, (c + a) (z + x) - by = c - a and (a + b) (x + y) - cz = a - b , where a + b + c ne 0, then x is equal to a) (c + b)/(a + b + c) b) (c - b)/(a + b + c) c) (a - b)/(a + b + c) d) (a + b)/(a + b + c)

If the roots of the equation a(b-c)x^(2) + b(c-a) x+c(a-b)=0 are equal, then prove that a, b, c are in H.P

If a, b, c, are in A. P, and (b−a), (c−b), a are in G.P, then a : b : c is