P and Q are two arbitrarily chosen intensive variables then

If x and y are arbitrary intensive variables, then

If x and y are arbitrary intensive variables, then

A point Plies inside the circles x^2+y^2-4=0 and x^2+y^2-8x+7=0 . The poirt P starts moving such that it is always inside the circles, its path enclosus greatest possible area and it is at a fixeddistance from an arbitrarily chosen point in its region. The locus of P is.

If A and B are two fixed points and P is a variable point such that PA + PB = 4 , the locus of P is

If p and q are two propositions, then ~ ( p harr q) is

S_(1) and S_(2) are two equally intense coherent point second sources vibrating in phase. The resultant intensity at P_(1) is 80 SI units then resultant intensity at P_(2) in SI units will be

G is the geometric mean and p and q are two arithmetic means between two numbers a and b, prove that : G^(2)=(2p-q)(2q-p)

Let p and be two propositions. Then the contrapositive of the implication p rarr q is

Two particles P and Q are moving as shown in the figure. At this moment of time the angular speed of P w.r.t. Q is

If TP and TQ are the two tangents to a circle with centre O so that /_P O Q=110^@ , then /_P T Q is equal to