Two particles start from point (2, -1), one moving two units along the line x+ y = 1 and the other 5 units along the line x - 2y = 4, If the particle move towards increasing y, then their new positions are:

Given lines intersect at P(2,-1).
Slope of line x+y-1 = 0 is -1.
`therefore "tan"theta = -1`
`therefore "cos"theta = -(1)/(sqrt(2)), "sin" theta = (1)/(sqrt(2))`
One particle moves 2 units upward from point P on the above line.
Thus coordinates of new position obtained by the particle are
`(2+2(-(1)/(sqrt(2))), -1+2 * (1)/(sqrt(2)))-= (2-sqrt(2), -1+sqrt(2))`
Slope of line x-2y-4=0 is 1/2.
`therefore " tan" theta = (1)/(2)`
`therefore " cos" theta = (2)/(sqrt(5)), "sin" theta = (1)/(sqrt(5))`
Other particle moves 5 units upward from point P on above line.
Then coordinates of new position obtained by the particle are
`(2+5((2)/(sqrt(5))), -1+5 * (1)/(sqrt(5)))-= (2+2sqrt(5), -1+sqrt(5))`