Match List I with the List II and select the correct answer using the code given below the lists : List IList II(A)If m and n are positive integers satisfying(P)91+cos2θ+cos4θ+cos6θ+cos8θ+cos10θ=cosmθ⋅sinnθsinθ ,then (m+n) is equal to(B)The minimum value of the expression 9x2sin2x+4xsinx for x∈(0,π) is (Q)10(C)Let f(x)=11−8sinx−2cos2x. If the maximum and minimum values of f(x)(R)11are denoted by M and m respectively, then M+8m has the value equal to (D)If tan9θ=34(where 0<θ<π18), then the value of (3 cosec 3θ−4sec3θ)(S)12 is equal to(T)13Which of the following is a CORRECT combination ?

Match List I with the List II and select the correct answer using the

1.	Match List I with the List II and select the correct answer using the code given below the lists : List IList II(A)If m and n are positive integers satisfying(P)91+cos2θ+cos4θ+cos6θ+cos8θ+cos10θ=cosmθ⋅sinnθsinθ ,then (m+n) is equal to(B)The minimum value of the expression 9x2sin2x+4xsinx for x∈(0,π) is (Q)10(C)Let f(x)=11−8sinx−2cos2x. If the maximum and minimum values of f(x)(R)11are denoted by M and m respectively, then M+8m has the value equal to (D)If tan9θ=34(where 0<θ<π18), then the value of (3 cosec 3θ−4sec3θ)(S)12 is equal to(T)13Which of the following is a CORRECT combination ?
Answer» Match $List I$ with the $List II$ and select the correct answer using the code given below the lists : $\begin{matrix} List I & List II (A) & If m and n are positive integers satisfying & (P) & 9 1 + cos 2 θ + cos 4 θ + cos 6 θ + cos 8 θ + cos 10 θ = \frac{cos m θ \cdot sin n θ}{sin θ}, then (m + n) is equal to (B) & The minimum value of the expression \frac{9 x^{2} {sin}^{2} x + 4}{x sin x} for x \in (0, π) is & (Q) & 10 (C) & Let f (x) = 11 - 8 sin x - 2 {cos}^{2} x . If the maximum and minimum values of f (x) & (R) & 11 are denoted by M and m respectively, then \frac{M + 8}{m} has the value equal to (D) & If tan 9 θ = \frac{3}{4} (where 0 < θ < \frac{π}{18}), then the value of (3 cosec 3 θ - 4 sec 3 θ) & (S) & 12 is equal to (T) & 13 \end{matrix}$ Which of the following is a CORRECT combination ?