[" 69.Given "A=(1,1)" and "AB" is any li...

[" 69.Given "A=(1,1)" and "AB" is any line through it cutting the "],[x-" -axis at "B" .If "AC" is perpendicular to "AB" and meets the "],[y" -axis in "C" ,then the equation of the locus of midpoint "P],[" of "BC" is "],[[" (a) "x+y=1," (b) "x+y=2],[" (c) "x+y=2xy," (d) "2x+2y=1]]

Similar Questions

Explore conceptually related problems

Given A-=(1,1) and AB is any line through it cutting the x-axist at B. If AC is perpendicular to AB and meets the y-axis in c, then the equatio of the locus of midpoint P of BC is

Given A-=(1,1) and A B is any line through it cutting the x-axis at Bdot If A C is perpendicular to A B and meets the y-axis in C , then the equation of the locus of midpoint P of B C is x+y=1 (b) x+y=2 x+y=2x y (d) 2x+2y=1

Given A-=(1,1) and A B is any line through it cutting the x-axis at Bdot If A C is perpendicular to A B and meets the y-axis in C , then the equation of the locus of midpoint P of B C is (a) x+y=1 (b) x+y=2 (c) x+y=2x y (d) 2x+2y=1

Given A=(1,1) and A B is any line through it cutting the x-axis at Bdot If A C is perpendicular to A B and meets the y-axis in C , then the equation of the locus of midpoint P of B C is (a) x+y=1 (b) x+y=2 (c) x+y=2x y (d) 2x+2y=1

The line x/a+y/b=1 cuts the coordinate axes at a and B a line perpendicular to AB meets the axes in P and Q. The equation of the locus of the point of intersection of the lines AQ and BP is

Let A3(0,4) and Bs(21,0)in R. Let the perpendicular bisector of AB at M meet the y- axis at R. Then the locus of midpoint P of MR is y=x^(2)+21

Let A3(0,4) and Bs(21,0) in R . Let the perpendicular bisector of AB at M meet the y-axis at R. Then the locus of midpoint P of MR is y=x^2 + 21

Let A be any point on the x-axis and B=(2,3). The perpendicular at A to the line AB meets the y-axis at C. Then the locus of midpoint of segment AC as A moves is given by

[" 69.Given "A=(1,1)" and "AB" is any line through it cutting the "],[x-" -axis at "B" .If "AC" is perpendicular to "AB" and meets the "],[y" -axis in "C" ,then the equation of the locus of midpoint "P],[" of "BC" is "],[[" (a) "x+y=1," (b) "x+y=2],[" (c) "x+y=2xy," (d) "2x+2y=1]]

Similar Questions

Recommended Questions