Let m be a positive integer and lct the lines `13x +11y=700` and `y=mx-1` intersect in a point `A (p, q)` whose coordinates are integer. Then `m+p+q` equals to

Let m be a positive integer and let the lines 13x + 11y = 700 and y= mx - 1 intersect in a point whose coordinates are integer. Then m equals to :

Let m be a positive integer and let the lines 13x + 11y = 700 and y= mx - 1 intersect in a point whose coordinates are integer. Then m equals to :

The point of injtersection of the line x/p+y/q=1 and x/q+y/p=1 lies on the line

The point of injtersection of the line x/p+y/q=1 and x/q+y/p=1 lies on the line

If the x-coordinate of the point of intersection of the lines x-y+3=0 and mx+2y+1=0 is integer,then the number of possible values of m are

Let the images of the point A(2, 3) about the lines y=x and y=mx are P and Q respectively. If the line PQ passes through the origin, then m is equal to

Let the images of the point A(2, 3) about the lines y=x and y=mx are P and Q respectively. If the line PQ passes through the origin, then m is equal to

If the two lines AB:(int_(0)^(2t)((sinx)/x+1)dx)x+y=3t and AC:2tx+y=0 intersect at a point A the x-coordinate of a point A as t to 0 , is equal to p/q (p and q are in their lowest form) the (p+q) is ………….

y = mx be a variable line (m is variable) intersect the lines 2x + y-2=0 and x-2y + 2 = 0 in P and Q.The locus of midpoint of segment of PQ is