Let P be (5,3) and a point R on y = x and Q on the X - axis be such that `PQ +QR+RP` is minimum ,then the coordinates of Q are

Let P(2,-1,4) and Q(4,3,2) are two points and as point R on PQ is such that 3PQ=5QR , then the coordinates of R are

If P=(1,1),Q=(3,2) and R is a point on x-axis then the value of PR+RQ will be minimum at

In DeltaPQR , the equation of the internal angle bisector of angle Q is y = x and the equation of side PR is 3x-y=2 . If coordinates of P are (3, 2) and 2PQ = RQ , then the coordinates of Q are

A line intersects the Y- axis and X-axis at the points P and Q, respectively. If (2,-5) is the mid- point of PQ, then the coordinates of P and Q are, respectively.

A line intersects the y-axis and x-axis at the points P and Q respectively. If (2, - 5) is the mid-point of PQ, then the coordinates of P and Q are respectively

The tangent to the ellipse (x^(2))/(25)+(y^(2))/(16)=1 at point P lying in the first quadrant meets x - axis at Q and y - axis at R. If the length QR is minimum, then the equation of this tangent is

The coordinates of P and Q are (-3, 4) and (2, 1), respectively. If PQ is extended to R such that PR=2QR , then what are the coordinates of R ?

The coordinates of P and Q are (- 3, 4) and (2, 1), respectively. If PQ is extended to R such that PR = 2QR, then what are the coordinates of R ?

The ends of a line segment are P(1,3) and Q(1,1), R a point on the line segment PQ such that PR:QR=1:lambda. If R is an interior point of the parabola y^(2)=4x then