Advertisements
Advertisements
प्रश्न
A(2, 5), B(–1, 2) and C(5, 8) are the vertices of a triangle ABC, `M' is a point on AB such that AM: MB = 1: 2. Find the coordinates of 'M'. Hence find the equation of the line passing through the points C and M
उत्तर
Let the coordinates of M be (x, y).
Thus, we have
`x = (m_1x_2 + m_2x_1)/(m_1+m_2) = (1xx(-1)+2xx2)/(1+2) = (-1+4)/3 = 3/3 = 1`
`y = (m_1y_2 + m_2y_2)/(m_1+m_2) = (1xx(2)+2xx5)/(1+2) = (2+10)/3 = 12/3 = 4`
⇒ Co-ordinates of M are (1,4).
Slope of line passing through C and M = m = `(4-8)/(1-5) = (-4)/(-4) = 1`
∴ Required equation is given by
y - 8 = 1(x - 5)
⇒ y - 8 = x - 5
⇒ y = x + 3
APPEARS IN
संबंधित प्रश्न
The line given by the equation `2x - y/3 = 7` passes through the point (k, 6); calculate the value of k.
The point (−3, 2) lies on the line ax + 3y + 6 = 0, calculate the value of a.
Find the equation of the line, whose x-intercept = −4 and y-intercept = 6
The line 5x - 3y +1 = 0 divides the join of (2,m) and (7,9) in the ratio 2: 3. Find the value of m.
Find the value of a line parallel to the following line:
`"x"/4 +"y"/3` = 1
Find the value of a line parallel to the following line:
`(2"x")/5 + "y"/3` = 2
Find the equation of a line whose slope and y-intercept are m = `2/3`, c = -2
ABCD is rhombus. The coordinates of A and C ae (3,7) and (9,15). Find the equation of BD.
Find the equation of a line passing through (3, – 2) and perpendicular to the line.
x - 3y + 5 = 0.
A and B are two points on the x-axis and y-axis respectively.
- Write down the coordinates of A and B.
- P is a point on AB such that AP : PB = 1 : 1.
Using section formula find the coordinates of point P. - Find the equation of a line passing through P and perpendicular to AB.
