Section Formula - Class XII

Internal and external division of line segments, midpoint formula, and coordinate geometry problems

21 Questions Published

Questions

Question 1 Multiple Choice (Single Answer)

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

  1. $-2$
  2. $ \displaystyle \frac{3}{5} $
  3. $ \displaystyle \frac{2}{5} $
  4. $6$
Question 2 Multiple Choice (Single Answer)

The points (22,23) divides the join of P (7,5) and Q externally in the ratio 3:5, then Q=

  1. $(3,7)$
  2. $(-3,7)$
  3. $(3,-7)$
  4. $(-3,-7)$
Question 3 Multiple Choice (Single Answer)

The point $(22, 33)$ divides the join of $P(7, 5)$ and $Q$ externally in the ratio $3 : 5$, then coordinates of $Q$ are

  1. $(3, 7)$
  2. $( - 3, -7)$
  3. $(3, - 7)$
  4. $( - 3, \frac{ - 41}{3})$
Question 4 Multiple Choice (Single Answer)

Find the co-ordinates of the point $P$ which divides segment $JL$ externally in the ratio $m:n$ in the following example:

$J(5, -3), L(0, 9), m:n = 4:3$

  1. <span>$(-15, 45)$</span>
  2. <span>$(15, -45)$</span>
  3. <span>$(15, 45)$</span>
  4. <span>$(-15, -45)$</span>
Question 5 Multiple Choice (Single Answer)

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

  1. $ B(x,y)=\left( 2,-\dfrac { 1 }{ 2 } \right) $
  2. $ B(x,y)=\left( -2,\dfrac { 1 }{ 2 }\right) $
  3. $ B(x,y)=\left( -2,-\dfrac { 1 }{ 2 } \right) $
  4. $ B(x,y)=\left( 2,\dfrac { 1 }{ 2 }\right)$
Question 6 Multiple Choice (Single Answer)

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 ____

  1. $\left(\displaystyle\frac{1}{2}, \frac{3}{2}\right)$
  2. $\left(\displaystyle\frac{7}{2}, \frac{1}{2}\right)$
  3. $(8, -1)$
  4. $(-1, 8)$
Question 7 Multiple Choice (Single Answer)

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

  1. $B(x,y)=(2, 6)$
  2. $B(x,y)=(-2,6)$
  3. $B(x,y)=(2,-6)$
  4. $B(x,y)=(-2,-6)$
Question 8 Multiple Choice (Single Answer)

Find the co-ordinates of the point dividing the join of $A(1, -2)$ and $B(4, 7)$ externally in the ratio of $2 : 1.$

  1. $(7, 16)$
  2. $(7,12)$
  3. $\left(3,\displaystyle \frac{16}{3}\right)$
  4. $(3,16)$
Question 9 Multiple Choice (Single Answer)

The point (11, 10) divides the line segment joining the points (5, -2) and (9, 6) in the ratio

  1. 1 : 3 internally
  2. 1 : 3 externally
  3. 3 : 1 internally
  4. 3 : 1 externally
Question 10 Multiple Choice (Single Answer)

Value of m for which the point P(m, 6) divides the join of A(-4, 3) and B(2, 8) is

  1. 5
  2. $\displaystyle \frac{3}{2}$
  3. $\displaystyle -\frac{2}{5}$
  4. None
Question 11 Multiple Choice (Single Answer)
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.
  1. (-12, 9)
  2. (-16, 9)
  3. (-24, 9)
  4. (-14, 9)
Question 12 Multiple Choice (Single Answer)

If the line joining A(2, 3) and B(-5, 7) is cut by x-axis at P then AP : PB is

  1. 3 : 7
  2. -3 : 7
  3. 7 : 3
  4. 7 : -3
Question 13 Multiple Choice (Single Answer)

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.

  1. $(24,9)$
  2. <span>$(-24,-9)$</span>
  3. <span>$(-24,9)$</span>
  4. <span>$(24,-9)$</span>
Question 14 Multiple Choice (Single Answer)

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

  1. $-2$
  2. $\displaystyle\frac{3}{5}$
  3. $\displaystyle\frac{2}{5}$
  4. $6$
Question 15 Multiple Choice (Single Answer)

Find the co-ordinates of a point C on AB produced such that $3AB = AC$, where $A = (3, 2)$ and $B = (-2, 4).$

  1. $(-12, 8)$
  2. $(8, 12)$
  3. $(12, 8)$
  4. $(-8, 12)$
Question 16 Multiple Choice (Single Answer)

Find $x$ and $y$ if $(2,5)$ is the midpoint of points $(x,y)$ and $(-5,6)$.

  1. $x=4, y=9$
  2. $x=9, y=4$
  3. $x=-9, y=4$
  4. $x=9, y=-4$
Question 17 Multiple Choice (Single Answer)

Find the coordinates of the point which divides the join of the points $(2,4)$ and $(6,8)$ externally in the ratio $5:3$.

  1. <span>$(12,14)$</span>
  2. <span>$(14,12)$</span>
  3. <span>$(-12,14)$</span>
  4. <span>$(12,-14)$</span>
Question 18 Multiple Choice (Single Answer)

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

  1. x - coordinates is $\dfrac {mx _2 - nx _1}{m - n}$
  2. x - coordinates is $\dfrac {my _2 - ny _1}{m - n}$
  3. Both (a) and (b) above
  4. None of these
Question 19 Multiple Choice (Single Answer)

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 $\left ( \dfrac{x _1+x _2}{2} , \dfrac{y _1 + y _2}{2} \right )$

  1. Statement - 1 is True, Statement - 2 is True, Statement - 2 is a correct explanation for Statement - 1
  2. Statement - 1 is True, Statement - 2 is True : Statement 2 is NOT a correct explanation for Statement - 1
  3. Statement - 1 is True, Statement - 2 is False
  4. Statement - 1 is False, Statement - 2 is True
Question 20 Multiple Choice (Single Answer)

The ratio in which the joining of (-3,2) and (5,6) is divided by the y-axis is

  1. 3:5
  2. 2:5
  3. 1:3
  4. 2:3
Question 21 Multiple Choice (Single Answer)

Consider points $A(-1,3), B(-1,2)$. Find point $P$ which divides $AB$ externally in $\dfrac{5}{4}$.

  1. $(9,-22)$
  2. <span>$(-1,2)$</span>
  3. <span>$(-1,-2)$</span>
  4. <span>$(9,22)$</span>