Section Formula - Class XII
Internal and external division of line segments, midpoint formula, and coordinate geometry problems
Questions
The ordinate of the point which divides the lines joining the origin and the point $(1,2) $ externally in the ratio of $3:2$ is
- $-2$
- $ \displaystyle \frac{3}{5} $
- $ \displaystyle \frac{2}{5} $
- $6$
The points (22,23) divides the join of P (7,5) and Q externally in the ratio 3:5, then Q=
- $(3,7)$
- $(-3,7)$
- $(3,-7)$
- $(-3,-7)$
The point $(22, 33)$ divides the join of $P(7, 5)$ and $Q$ externally in the ratio $3 : 5$, then coordinates of $Q$ are
- $(3, 7)$
- $( - 3, -7)$
- $(3, - 7)$
- $( - 3, \frac{ - 41}{3})$
Find the co-ordinates of the point $P$ which divides segment $JL$ externally in the ratio $m:n$ in the following example:
- <span>$(-15, 45)$</span>
- <span>$(15, -45)$</span>
- <span>$(15, 45)$</span>
- <span>$(-15, -45)$</span>
The co-ordinates of the point B which divides segment PQ joining the points $P(-2,-4)$ and $Q(-2,-1)$ externally in the ratio $m: n=7:1$ are
- $ B(x,y)=\left( 2,-\dfrac { 1 }{ 2 } \right) $
- $ B(x,y)=\left( -2,\dfrac { 1 }{ 2 }\right) $
- $ B(x,y)=\left( -2,-\dfrac { 1 }{ 2 } \right) $
- $ B(x,y)=\left( 2,\dfrac { 1 }{ 2 }\right)$
If $A(-2,5)$ and $B(3,2)$ are the points on a straight line. If ${AB}$ is extended to $'C'$ such that $AC=2BC$, then the co-ordinates of $'C'$ are ____
- $\left(\displaystyle\frac{1}{2}, \frac{3}{2}\right)$
- $\left(\displaystyle\frac{7}{2}, \frac{1}{2}\right)$
- $(8, -1)$
- $(-1, 8)$
The co-ordinates of the point B which divides segment PQ joining the points $P(-2,-4)$ and $Q(-2,-1)$ in the ratio $m:n = 2 : 5$, are
- $B(x,y)=(2, 6)$
- $B(x,y)=(-2,6)$
- $B(x,y)=(2,-6)$
- $B(x,y)=(-2,-6)$
Find the co-ordinates of the point dividing the join of $A(1, -2)$ and $B(4, 7)$ externally in the ratio of $2 : 1.$
- $(7, 16)$
- $(7,12)$
- $\left(3,\displaystyle \frac{16}{3}\right)$
- $(3,16)$
The point (11, 10) divides the line segment joining the points (5, -2) and (9, 6) in the ratio
- 1 : 3 internally
- 1 : 3 externally
- 3 : 1 internally
- 3 : 1 externally
Value of m for which the point P(m, 6) divides the join of A(-4, 3) and B(2, 8) is
- 5
- $\displaystyle \frac{3}{2}$
- $\displaystyle -\frac{2}{5}$
- None
- (-12, 9)
- (-16, 9)
- (-24, 9)
- (-14, 9)
If the line joining A(2, 3) and B(-5, 7) is cut by x-axis at P then AP : PB is
- 3 : 7
- -3 : 7
- 7 : 3
- 7 : -3
Find the coordinates of the point which divides the line segment joining the points $(6, 3)$ and $(-4, 5)$ in the ratio $3 : 2$, externally.
- $(24,9)$
- <span>$(-24,-9)$</span>
- <span>$(-24,9)$</span>
- <span>$(24,-9)$</span>
The ordinate of the point which divides the line joining the origin and the point (1, 2) externally in the ratio of 3 : 2 is
- $-2$
- $\displaystyle\frac{3}{5}$
- $\displaystyle\frac{2}{5}$
- $6$
Find the co-ordinates of a point C on AB produced such that $3AB = AC$, where $A = (3, 2)$ and $B = (-2, 4).$
- $(-12, 8)$
- $(8, 12)$
- $(12, 8)$
- $(-8, 12)$
Find $x$ and $y$ if $(2,5)$ is the midpoint of points $(x,y)$ and $(-5,6)$.
- $x=4, y=9$
- $x=9, y=4$
- $x=-9, y=4$
- $x=9, y=-4$
Find the coordinates of the point which divides the join of the points $(2,4)$ and $(6,8)$ externally in the ratio $5:3$.
- <span>$(12,14)$</span>
- <span>$(14,12)$</span>
- <span>$(-12,14)$</span>
- <span>$(12,-14)$</span>
If the join of the two points $(x _1, y _1)$, $(x _2, y _2)$ is divided by a point R externally in ratio $m : n$ then
- x - coordinates is $\dfrac {mx _2 - nx _1}{m - n}$
- x - coordinates is $\dfrac {my _2 - ny _1}{m - n}$
- Both (a) and (b) above
- None of these
STATEMENT - 1 : The coordinates of the point P(x, y) which divides the line segment joining the points A$(x _1, y _1)$ and B$(x _2, y _2)$ internally in the ration $m _1$ : $m _2$ are $\left ( \dfrac{m _1 x _2 -m _2 x _1}{m _1 + m _2} , \dfrac{m _1 y _2 - m _2 y _1}{m _1 + m _2}\right )$
STATEMENT - 2 : The mid-point of the line segment joining the points P $(p _1 y _1)$ and Q$(x _2, y _2)$ is $\left ( \dfrac{x _1+x _2}{2} , \dfrac{y _1 + y _2}{2} \right )$
- Statement - 1 is True, Statement - 2 is True, Statement - 2 is a correct explanation for Statement - 1
- Statement - 1 is True, Statement - 2 is True : Statement 2 is NOT a correct explanation for Statement - 1
- Statement - 1 is True, Statement - 2 is False
- Statement - 1 is False, Statement - 2 is True
The ratio in which the joining of (-3,2) and (5,6) is divided by the y-axis is
- 3:5
- 2:5
- 1:3
- 2:3
Consider points $A(-1,3), B(-1,2)$. Find point $P$ which divides $AB$ externally in $\dfrac{5}{4}$.
- $(9,-22)$
- <span>$(-1,2)$</span>
- <span>$(-1,-2)$</span>
- <span>$(9,22)$</span>