Let P and Q be `3xx3` matrices with `P!=Q` . If `P^3=""Q^3a n d""P^2Q""=""Q^2P` , then determinant of `(P^2+""Q^2)` is equal to (1) `2` (2) 1 (3) 0 (4) `1`

The Boolean expression ~(pvvq)vv(~p^^q) is equivalent to (1) ~p (2) p (3) q (4) ~q

If P=[{:(1,2,1),(1,3,1):}], Q=PP^(T) , then the value of the determinant of Q is equal to -

For 0 le P, Q le (pi)/(2) , if sin P+cos Q=2 , then the value of tan((P+Q)/(2)) is equal to

The Boolean Expression (p^^~ q)vvqvv(~ p^^q) is equivalent to : (1) ~ p^^q (2) p^^q (3) pvvq (4) pvv~ q

Let's resolve into factors: (p^2 - 3q^2)^2 - 16 (p^2 - 3q^2) + 63

If r^[th] and (r+1)^[th] term in the expansion of (p+q)^n are equal, then [(n+1)q]/[r(p+q)] is (a) 1/2 (b) 1/4 (c) 1 (d) 0

If z=x-iy and z^(1/3)=p+iq then (x/p+y/q)/(p^2+q^2) is equal to

P and Q are points on the line joining A(-2,5) and B(3,1) such that A P=P Q=Q B . Then, the distance of the midpoint of P Q from the origin is 3 (b) (sqrt(37))/2 (b) 4 (d) 3.5

Let's write the value of pq by calculation if (2p - 3q) = 10 and (8p^3 - 27q^3) = 100

If p >1 and q >1 are such that log(p+q)=logp+logq , then the value of log(p-1)+"log"(q-1) is equal to 0 (b) 1 (c) 2 (d) none of these