The line joining the points (0,3) and (5,-2) becomes tangent to the curve `y=c/(x+1)` then c=

Find value of c such that line joining the points (0,3) and (5,-2) becomes tangent to curve y=(c)/(x+1)

If the line joining the points (0,3) and (5,-2) is a tangent to the curve y=(C)/(x+1), then the value of c is 1(b)-2(c)4(d) none of these

Find value of c such that line joining the points (0, 3) and (5, -2) is a tangent to curve y=c/(x+1)

Find value of c such that line joining points (0, 3) and (5, -2) becomes tangent to y=(c)/(x+1) .

If the line joining the points A(2,3,-1) and B(3,5,-3) is perpendicular to the line joining the points C(1,2,3) and D(3,y,7) then y=

Determine the values of x and y so that the line joining the points A(x,3,11),B(1,1,-2) is parallel to the line joining the points C(2,5,3),D(-4,y,-6).

If the lines joining the points of intersection of the curve 4x^(2)+9y+18xy=1 and the line y=2x+c the origin are equally inclined to the y-axis,the c is: -1 (b) (1)/(3)( c) (2)/(3)(d)-(1)/(2)