find the equation of the line cutting off an intercept -2 from the y-axis and equally inclined to the axes?
Answers
None of these.
None of these.Explanation:
None of these.Explanation:The question states that the y-intercept of both the lines is -1.
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.Let the equations of both the lines be,
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.Let the equations of both the lines be,Given that the y-intercept of both the lines is -1.
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.Let the equations of both the lines be,Given that the y-intercept of both the lines is -1.This property is found in option (ii).
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.Let the equations of both the lines be,Given that the y-intercept of both the lines is -1.This property is found in option (ii).Now, it is given that both the lines are equally inclined to the axes. Hence, they have equal slopes.
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.Let the equations of both the lines be,Given that the y-intercept of both the lines is -1.This property is found in option (ii).Now, it is given that both the lines are equally inclined to the axes. Hence, they have equal slopes.The above property is seen in none of the options.
None of these.Explanation:The question states that the y-intercept of both the lines is -1.Therefore, the general equation of line,From which we derive the slope-intercept form of the line,Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.Let the equations of both the lines be,Given that the y-intercept of both the lines is -1.This property is found in option (ii).Now, it is given that both the lines are equally inclined to the axes. Hence, they have equal slopes.The above property is seen in none of the options.Hence, no option satisifies the given conditions.
- Answer:
- None of these.
- Explanation:
- The question states that the y-intercept of both the lines is -1.
- Therefore, the general equation of line,
- From which we derive the slope-intercept form of the line,
- Where -(a/b) is the slope of the line and -(c/b) is the y-intercept.
- Let the equations of both the lines be,
- Given that the y-intercept of both the lines is -1.
- This property is found in option (ii).
- Now, it is given that both the lines are equally inclined to the axes. Hence, they have equal slopes.
- The above property is seen in none of the options.
- Hence, no option satisifies the given conditions.