Show that if any line through the variab...

Show that if any line through the variable point `A(k+1,2k)` meets the lines `7x+y-16=0,5x-y-8=0,x-5y+8=0` at `B ,C ,D ,` respectively, the `A C ,A B ,a n dA D` are in harmonic progression. (The three lines lie on the same side of point `Adot)dot`

Similar Questions

Explore conceptually related problems

A line through the variable point A(k+1,2k) meets the lines 7x+y-16=0,5x-y-8=0,x-5y+8=0 at B ,C ,D , respectively. Prove that A C ,A B ,A D are in HP.

A Line through the variable point A(1+k;2k) meets the lines 7x+y-16=0; 5x-y-8=0 and x-5y+8=0 at B;C;D respectively. Prove that AC;AB and AD are in HP.

Prow that the line through the point (x_1, y_1) and parallel to the line A x+B y+C=0 is A(x-x_1)+B(y-y_1)=0 .

A straight line through origin O meets the lines 3y=10-4x and 8x+6y+5=0 at point A and B respectively. Then , O divides the Segment AB in the ratio.

A line through A(-5,-4) meets the lines x+3y+2=0,2x+y+4=0a n dx-y-5=0 at the points B , Ca n dD respectively, if ((15)/(A B))^2+((10)/(A C))^2=(6/(A D))^2 find the equation of the line.

A circle having centre at C is made to pass through the point P(1,2), touching the straight lines 7x-y=5 and x+y+13=0 at A and B respectively. Then

A line through A(-5,-4) meets the lines x+3y+2=0,2x+y+4=0a n dx-y-5=0 at the points B , Ca n dD rspectively, if ((15)/(A B))^2+((10)/(A C))^2=(6/(A D))^2 find the equation of the line.

The orthocentre of the triangle formed by the lines x - 7y + 6 = 0, 2x - 5y - 6 = 0 and 7x + y - 8 = 0 is

Find the equation of the line passing through the point of intersection of the lines x+5y+7=0 and 3x+2y-5=0 (b) perpendicular to the line 7x + 2y - 5 = 0

Show that if any line through the variable point `A(k+1,2k)` meets the lines `7x+y-16=0,5x-y-8=0,x-5y+8=0` at `B ,C ,D ,` respectively, the `A C ,A B ,a n dA D` are in harmonic progression. (The three lines lie on the same side of point `Adot)dot`

Similar Questions

Recommended Questions