Question

A straight line passes through the point A(1,2) and makes an angle theta with the positive direction of x axes. find theta,given that the distance of A from the point of intersection of this line with the line x+y=4 is root5/3 unit?

Answer 1

given that a straight line passes through the point A(1,2) and makes an angle `theta` with the positive direction of x axes, we can write its equation as

`y-2=(x-1)tantheta ......[1]`

Solving this equation with equation

`x+y=4......[2]`

Subtracting [1] from[2]

`x+2=4-(x-1)tantheta`

`=>x+2=4-xtantheta+tantheta`

`=>x+xtantheta=2+tantheta`

`=>x=(2+tantheta)/(1+tantheta)`

So `y=4-x=4-(2+tantheta)/(1+tantheta)=(2+3tantheta)/(1+tantheta)`

So point of intersection of [1] and [2] is

`((2+tantheta)/(1+tantheta),(2+3tantheta)/(1+tantheta))`

Given that the distance of A from the point of intersection of this line with the line x+y=4 is `sqrt5/3` unit, we can write

`((2+tantheta)/(1+tantheta)-1)^2+((2+3tantheta)/(1+tantheta)-2)^2=(sqrt5/3)^2`

`=>1/(1+tantheta)^2+tan^2theta/(1+tantheta)^2=5/9`

`=>(1+tan^2theta)/(1+tantheta)^2=5/9`

`=>sec^2theta/(1+tantheta)^2=5/9`

`=>sectheta/(1+tantheta)=sqrt5/3`

`=>1/(costheta+sintheta)=sqrt5/3`

`=>costheta+sintheta=3/sqrt5`

`=>1/sqrt2costheta+1/sqrt2sintheta=3/sqrt10`

`=>cos(theta-45^@)=3/sqrt10=cos18.4^@`

`=>theta= 63.4^@`