Advertisements
Advertisements
प्रश्न
Fill in the blank using correct alternative.
Out of the following, point ........ lies to the right of the origin on X– axis.
विकल्प
(–2,0)
(0,2)
(2,3)
(2,0)
उत्तर
Out of the following, point (2,0) lies to the right of the origin on X– axis.
संबंधित प्रश्न
Find the slope of the line parallel to AB if : A = (−2, 4) and B = (0, 6)
Find the slope of the line perpendicular to AB if : A = (3, −2) and B = (−1, 2)
(−2, 4), (4, 8), (10, 7) and (11, –5) are the vertices of a quadrilateral. Show that the quadrilateral, obtained on joining the mid-points of its sides, is a parallelogram.
The side AB of an equilateral triangle ABC is parallel to the x-axis. Find the slopes of all its sides.
The points (−3, 2), (2, −1) and (a, 4) are collinear. Find a.
Find the value of p if the lines, whose equations are 2x – y + 5 = 0 and px + 3y = 4 are perpendicular to each other.
If the lines y = 3x + 7 and 2y + px = 3 are perpendicular to each other, find the value of p.
Find the slope of the line passing through the points G(4, 5) and H (–1, –2).
Find the slope of the lines passing through the given point.
P (–3, 1) , Q (5, –2)
Find the slope of the lines passing through the given point.
L (–2, –3) , M (–6, –8)
Show that points P(1, –2), Q(5, 2), R(3, –1), S(–1, –5) are the vertices of a parallelogram.
Show that A(4, –1), B(6, 0), C(7, –2) and D(5, –3) are vertices of a square.
Find the slope of a line, correct of two decimals, whose inclination is 60°
Find the value of x so that the line passing through (3, 4) and (x, 5) makes an angle 135° with positive direction of X-axis.
If the lines 7y = ax + 4 and 2y = 3 − x, are parallel to each other, then the value of ‘a’ is:
Find the slope of the line passing through given points G(3, 7) and K(–2, –3).
Determine whether the following points are collinear. A(–1, –1), B(0, 1), C(1, 3)
Given: Points A(–1, –1), B(0, 1) and C(1, 3)
Slope of line AB = `(square - square)/(square - square) = square/square` = 2
Slope of line BC = `(square - square)/(square - square) = square/square` = 2
Slope of line AB = Slope of line BC and B is the common point.
∴ Points A, B and C are collinear.
If the lines kx – y + 4 = 0 and 2y = 6x + 7 are perpendicular to each other, find the value of k.
