Equation(s) of the straight line(s), inc...

Equation(s) of the straight line(s), inclined at `30^0` to the x-axis such that the length of its (each of their) line segment(s) between the coordinate axes is 10 units, is (are) `x+sqrt(3)y+5sqrt(3)=0` `x-sqrt(3)y+5sqrt(3)=0` `x+sqrt(3)y-5sqrt(3)=0` `x-sqrt(3)y-5sqrt(3)=0`

`x-sqrt3y+5sqrt3=0`

`x+sqrt3y+5sqrt3=0`

`x-sqrt3y-5sqrt3=0`

`x+sqrt3y-5sqrt3=0`

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Equation(s) of the straight line(s),inclined at 30^(0) to the x-axis such that the length of its (each of their) line segment(s) between the coordinate axes is 10 units,is (are) x+sqrt(3)y+5sqrt(3)=0x-sqrt(3)y+5sqrt(3)=0x+sqrt(3)y-5sqrt(3)=0x-sqrt(3)y-5sqrt(3)=0

sqrt(2)x + sqrt(3)y=0 sqrt(5)x - sqrt(2)y=0

sqrt (2x) -sqrt (3y) = 0sqrt (3x) -sqrt (3y) = 0

2sqrt(3)x^(2)+x-5sqrt(3)=0

sqrt(2)x+sqrt(3)y=0 sqrt(3)x+sqrt(8)y=0

sqrt(2)x+sqrt(3)y=0sqrt(3)x-sqrt(8)y=0

The equation of the lines passing through the point (1,0) and at a distance (sqrt(3))/(2) from the origin is sqrt(3)+y-sqrt(3)=0x+sqrt(3)y-sqrt(3)=0sqrt(3)x-y-sqrt(3)=0x-sqrt(3)y-sqrt(3)=0

(2)/(sqrt(3)+sqrt(5))+(5)/(sqrt(3)-sqrt(5))=x sqrt(3)+y sqrt(5)

Solve for x and ysqrt(2)x-sqrt(3)y=0,sqrt(5)x+sqrt(2)y=0

If sqrt(3)x-sqrt(2y)=sqrt(3);sqrt(5)x+sqrt(3)y=sqrt(2) then x and y are

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