Let the area of the triangle formed by a straight line with co-ordinate axes be square units. If the perpendicular drawn from the origin to the line makes an angle of with the positive x-axis, then the value of is:
- A
- B
- C
- D
Let the area of the triangle formed by a straight line with co-ordinate axes be square units. If the perpendicular drawn from the origin to the line makes an angle of with the positive x-axis, then the value of is:
Correct answer:C
Standard Method
Given: The line is and the area of the triangle formed with the coordinate axes is square units.
Find: The value of .
The intercept form of the line is
So the x-intercept is and the y-intercept is .
Hence, the area of the triangle formed by the line with the coordinate axes is
Therefore,
The perpendicular from the origin to the line makes an angle of with the positive x-axis. For the line , the normal vector is , so
Thus,
Substituting into the area relation,
Therefore,
The correct option is C.
Step-by-step Derivation
Given: A straight line forms a triangle with the coordinate axes of area square units. The perpendicular from the origin to this line makes an angle of with the positive x-axis.
Find: .
For the line , the direction of the perpendicular from the origin is the direction of the normal vector . Here,
Since the perpendicular makes an angle with the positive x-axis,
So,
Now find the intercepts of the line.
Setting gives the x-intercept:
Setting gives the y-intercept:
Therefore, the triangle formed with the axes has base and height . Its area is
That is,
Using ,
Hence,
Now,
Therefore, the required value is , so the correct option is C.
Using the slope of the line instead of the slope of the perpendicular. The angle is for the normal to the line, not for the line itself. Use the normal vector , so .
Ignoring absolute values while using the intercept-area formula. Intercepts can be negative, but area must be positive. Use .
Finding the y-intercept incorrectly as or some rearranged form. From , putting gives .
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