Advertisements
Advertisements
प्रश्न
Two vertices of a triangle are (−2, −1) and (3, 2) and third vertex lies on the line x + y = 5. If the area of the triangle is 4 square units, then the third vertex is
विकल्प
(0, 5) or, (4, 1)
(5, 0) or, (1, 4)
(5, 0) or, (4, 1)
(0, 5) or, (1, 4)
(2, 3)
उत्तर
Let (h, k) be the third vertex of the triangle.
It is given that the area of the triangle with vertices (h, k), (−2, −1) and (3, 2) is 4 square units.
\[\frac{1}{2}\left| h\left( - 1 - 2 \right) - 3\left( - 1 - k \right) - 2\left( 2 - k \right) \right| = 4\]
\[\Rightarrow 3h - 5k + 1 = \pm 8\]
Taking positive sign, we get,
\[3h - 5k + 1 = 8\]
\[3h - 5k - 7 = 0\] ... (1)
Taking negative sign, we get,
\[3h - 5k + 9 = 0\] ... (2)
The vertex (h, k) lies on the line x + y = 5.
\[h + k - 5 = 0\] ... (3)
On solving (1) and (3), we find (4, 1) to be the coordinates of the third vertex.
Similarly, on solving (2) and (3), we find (2, 3) to be the coordinates of the third vertex.
Disclaimer: The correct option is not given in the question of the book.
Notes
Disclaimer: The correct option is not given in the question of the book.
APPEARS IN
संबंधित प्रश्न
Find equation of the line perpendicular to the line x – 7y + 5 = 0 and having x intercept 3.
The line through the points (h, 3) and (4, 1) intersects the line 7x – 9y – 19 = 0. at right angle. Find the value of h.
If p and q are the lengths of perpendiculars from the origin to the lines x cos θ – y sin θ = k cos 2θ and xsec θ+ y cosec θ = k, respectively, prove that p2 + 4q2 = k2.
If p is the length of perpendicular from the origin to the line whose intercepts on the axes are a and b, then show that `1/p^2 = 1/a^2 + 1/b^2`.
Find the equation of a line which makes an angle of tan−1 (3) with the x-axis and cuts off an intercept of 4 units on negative direction of y-axis.
Find the equation of the line which intercepts a length 2 on the positive direction of the x-axis and is inclined at an angle of 135° with the positive direction of y-axis.
Find the equation of the right bisector of the line segment joining the points (3, 4) and (−1, 2).
For what values of a and b the intercepts cut off on the coordinate axes by the line ax + by + 8 = 0 are equal in length but opposite in signs to those cut off by the line 2x − 3y + 6 = 0 on the axes.
Find the equation of a line for p = 4, α = 150°.
Find the equation of the straight line upon which the length of the perpendicular from the origin is 2 and the slope of this perpendicular is \[\frac{5}{12}\].
Reduce the equation \[\sqrt{3}\] x + y + 2 = 0 to slope-intercept form and find slope and y-intercept;
Reduce the equation \[\sqrt{3}\] x + y + 2 = 0 to the normal form and find p and α.
Reduce the following equation to the normal form and find p and α in \[x + \sqrt{3}y - 4 = 0\] .
Reduce the following equation to the normal form and find p and α in y − 2 = 0.
Reduce the lines 3 x − 4 y + 4 = 0 and 2 x + 4 y − 5 = 0 to the normal form and hence find which line is nearer to the origin.
Find the point of intersection of the following pairs of lines:
\[y = m_1 x + \frac{a}{m_1} \text { and }y = m_2 x + \frac{a}{m_2} .\]
Prove that the lines \[y = \sqrt{3}x + 1, y = 4 \text { and } y = - \sqrt{3}x + 2\] form an equilateral triangle.
Find the equation of the line joining the point (3, 5) to the point of intersection of the lines 4x + y − 1 = 0 and 7x − 3y − 35 = 0.
Find the coordinates of the incentre and centroid of the triangle whose sides have the equations 3x− 4y = 0, 12y + 5x = 0 and y − 15 = 0.
Prove that the following sets of three lines are concurrent:
3x − 5y − 11 = 0, 5x + 3y − 7 = 0 and x + 2y = 0
Find the conditions that the straight lines y = m1 x + c1, y = m2 x + c2 and y = m3 x + c3 may meet in a point.
Find the equation of the perpendicular bisector of the line joining the points (1, 3) and (3, 1).
Find the equation of the straight line perpendicular to 2x − 3y = 5 and cutting off an intercept 1 on the positive direction of the x-axis.
Find the equation of the right bisector of the line segment joining the points (a, b) and (a1, b1).
Determine whether the point (−3, 2) lies inside or outside the triangle whose sides are given by the equations x + y − 4 = 0, 3x − 7y + 8 = 0, 4x − y − 31 = 0 .
Write the coordinates of the orthocentre of the triangle formed by the lines xy = 0 and x + y = 1.
Write the area of the figure formed by the lines a |x| + b |y| + c = 0.
The point which divides the join of (1, 2) and (3, 4) externally in the ratio 1 : 1
If the lines ax + 12y + 1 = 0, bx + 13y + 1 = 0 and cx + 14y + 1 = 0 are concurrent, then a, b, c are in
The number of real values of λ for which the lines x − 2y + 3 = 0, λx + 3y + 1 = 0 and 4x − λy + 2 = 0 are concurrent is
Find the equation of the line where length of the perpendicular segment from the origin to the line is 4 and the inclination of the perpendicular segment with the positive direction of x-axis is 30°.
Find the equation of the straight line which passes through the point (1, – 2) and cuts off equal intercepts from axes.
If the intercept of a line between the coordinate axes is divided by the point (–5, 4) in the ratio 1 : 2, then find the equation of the line.
The line which cuts off equal intercept from the axes and pass through the point (1, –2) is ______.
Locus of the mid-points of the portion of the line x sin θ + y cos θ = p intercepted between the axes is ______.
Reduce the following equation into intercept form and find their intercepts on the axes.
3x + 2y – 12 = 0
Reduce the following equation into intercept form and find their intercepts on the axes.
4x – 3y = 6
