Prove that the points represented by the roots of the equation `z^2=(1+z)^4` the straight line. Find the complex equation of the straight line.

A straight line passes throught the point (-1,4) and makes an angle 60^(@) with the positive direction of the x- axis . Find the equation of the straight line.

Prove that the points (1,11),(2,15),(-3,-5) are collinear and find the equation of the straight line containing them.

Prove that the point (1,11),(2,15),(-3,-5) are collinear and find the equation of the straight line containing them.

Find the equation of the straight line passing throught the point (-3,4) and parallel to the straight line 2x-3y=5.

The equation ax+by+c=0 represents a straight line

If the equation of a straight line is 6x-2=3y+1=2z-2 , then direction cosines of the line are -

Prove that the points (3,1), (5,-5) and (-1,13) are collinear . Find the equation of the straight line on which the points lie.

The equations to the straight line through (a, b, c) parallel to the z -axis are

Prove that the points (4,3),(1,4)and (-2,5) are collinear. Also find out the equation of the straight line on which these points lie.

Prove that the points (4,3),(1,4)and (-2,5) are collinear. Also find out the equation of the straight line on which these points lie.