If `m and M` respectively denote the minimum and maximum of `f(x)=(x-1)^2 +3` for `x in [-3,1],` then the ordered pair `(m, M)` is equal to

If ma and M respectively denote the minimum and maximum of f(x) =(x-1)^2+3 for x in [-3,1] then the ordered pair (m,M)=

If m and M respectively the minimum and maximum of f(x)=(x-1)^(2)+3 for x in[-3,1] then the ordered pair (m, M) is equal to

If m is the minimu value of k for which the function f(x)=xsqrt(kx-x^(2)) is increasing in the interval [0,3] and M is the maximum value of f in the inverval [0,3] when h=m, then the ordered pair (m,M) is equal to

If m is the minimum value of k for which the function f(x)=xsqrt(kx-x^(2)) is increasing in the interval [0,3] and M is the maximum value of f in the inverval [0,3] when k=m, then the ordered pair (m,M) is equal to (a) (4,3sqrt(2)) (b) (4,3sqrt(3)) (c) (3,3sqrt(3)) (d) (5,3sqrt(6))

If m and M are the minimum and the maximum values of 4 + (1)/(2) sin^(2) 2x -2 cos^(4) x, x in R , then M-m is equal to:

If m and M are the minimum and the maximum values of 4+1/2 sin^2 2x-2cos^4x, x in R then M-m is equal to...

If minimum and maximum values of f(x)=2|x-1|+|x-3|-3|x-4| are m and M respectively then (m+M) equals

If m and M are the minimum and the maximum values of 4+(1)/(2)sin^(2)2x-2cos^(4)x,x in RR then M-m is equal to

Let M and m respectively be the maximum and minimum values of the function f(x) = tan^(-1) (sin x + cos x) " in " [0, (pi)/(2)] . Then the vlaue of tan (M-m) is equal to :