Let fk(x) = 1/k(sin^k x + cos^k x) where...

Let `f_k(x) = 1/k(sin^k x + cos^k x)` where `x in RR` and `k gt= 1.` Then `f_4(x) - f_6(x)` equals

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Let f_k(x)=(1)/(k)(sin^k x+ cos^k x) " where " x in R and k ge 1 . Then f_4(x)-f_6(x) equals

Let f_K(x)""=1/k(s in^k x+cos^k x) where x in R and kgeq1 . Then f_4(x)-f_6(x) equals (1) 1/6 (2) 1/3 (3) 1/4 (4) 1/(12)

Let f_K(x)""=1/k(s in^k x+cos^k x) where x in R and kgeq1 . Then f_4(x)-f_6(x) equals (1) 1/6 (2) 1/3 (3) 1/4 (4) 1/(12)

Let f_(k) ""=(1)/(k) ( sin ^(k) x + cos^(k)x), where x in RR and k gt 1 then f_(4) (x)- f_(6)(x) equals -

Let f_(4)(x) = (1)/(k) [ sin^(k) + cos^(k) x ] where x in RR and k ge 1. then f_(4)(x) - f_(6)(x) =

Let f_(k)(x)=(1)/(k)(sin^(k)x+cos^(k)x) where x in R and k>=1. Then f_(4)(x)-f_(6)(x) equals

Let f_(k)(x)=(1)/(k)(sin^(k)x+cos^(k)x) where x in R and k ge1 , then f_(4)(x)-f_(6)(x) equals

Let f_(k)(x)=(1)/(k)(sin^(k)x+cos^(k)x) where x in R and kge1 then f_(4)(x)-f_(6)(x) equals

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