Find the following:
The y coordinate of any point on the x – axis.
[To solve such questions, following are the key points:
1. X coordinate of any point on Y axis is 0.
2. Y coordinate of any point on X axis is 0.
3. If a line is parallel to X axis, then its X coordinate varies, but Y coordinate remains constant.
4. If a line is parallel to Y axis, then its Y coordinate varies, but X coordinate remains constant.]
Since, the equation of X – axis is y = 0, y coordinate of any point on X – axis is 0(zero).
Find the following:
The x coordinate of any point on the y – axis.
Since, the equation of Y axis is x = 0,coordinate of any point on Y axis is 0(zero).
Find the following:
The coordinates of the origin.
Origin is the intersection of X axis and Y axis, the i.e. intersection of lines y = 0 and x = 0.
Therefore,
Coordinates of origin is (0,0).
Find the following:
The y – coordinate of any point on the line through (0, 1), parallel to the x – axis.
Since the line is parallel to x – axis, its equation will be of the form y = c, where c is a constant.
Point (0,1) is on the line, therefore, it will satisfy the equation of the line.
Putting y = 1 in the equation of a line,
We get,
1 = c.
Therefore, the equation of line will be y = 1.
Hence, y coordinate of any point on the line through (0,1),parallel to the x axis is 1.
Find the following:
The y coordinate of any point on the line through (1, 0), parallel to the y – axis
Since the line is parallel to y – axis , its equation will be of the form x = c, where c is a constant.
Point (1,0) is on the line, therefore, it will satisfy the equation of the line.
Putting x = 1 in the equation of a line,
We get,
1 = c.
Therefore, the equation of line will be x = 1.
Hence, y coordinate of any point on the line through (1,0), parallel to the y axis is 1.
Find the coordinates of the other three vertices of the rectangle below:
Vertex O is the origin.
Therefore, its coordinates are (0,0).
Vertex A is on the Y – axis.
Therefore its X coordinate = 0.
Line joining vertex A and (4,3) in parallel to X – axis, therefore its y coordinate will remain constant. Since point A is on the line, its Y coordinate = 3
Therefore coordinates of vertex A are(0,3)
Vertex B is on X – axis.
Therefore it's Y coordinate = 0.
Line joining vertex B and (4,3) in parallel to Y – axis, therefore its x coordinate will remain constant. Since point A is on the line, its x coordinate = 4
Therefore coordinates of vertex A are(4,0)
Hence, the coordinate of the other three vertices of the given rectangle is (0,0),(0,3) and (4,0).
In the rectangle shown below, the sides are parallel to the axes and origin is the midpoint:
What are the coordinates of the other three vertices?
Since, O is the midpoint of the rectangle and sides of the rectangle are parallel to coordinate axis,
The rectangle is symmetrical about both X and Y axis.
Line AB is parallel to Y – axis,
∴ X coordinate will remain same
∴ X coordinate of B = 3
A is 2 units above X – axis , therefore by symmetry B will be 2 units below X – axis.
∴ Y coordinate of B = – 2
∴ coordinates of B = (3, – 2)
BC is parallel to the X axis
∴ Y coordinate will remain constant
∴ Y coordinate of C = – 2
B is 3 units right to the Y axis,
∴ by symmetry C will be 3 units to left of Y – axis.
∴ X coordinate of C = – 3
∴ coordinates of C = (– 3, – 2)
CD is parallel to Y – axis,
∴ X coordinate will remain constant
∴ X coordinate of D = – 3
The AD is parallel to X – axis,
∴ Y coordinate will remain constant
∴Y coordinate of D = 2
∴ coordinates of D = (– 3,2)
Hence, the coordinates of other three vertices are (3, – 2),(– 3, – 2)
And (– 3,2)
The triangle shown below is equilateral:
Find the coordinates of its vertices.
Vertex O is the origin.
Therefore, its coordinates (0,0).
Vertex A is on X axis, therefore, its y coordinate = 0.
Vertex A is 4 units away from y – axis in the direction of the positive X – axis.
Therefore, the x coordinate of A = 4
∴ coordinates of A = (4,0).
Consider triangle OBD,
OB = 4 units(All sides of an equilateral triangle are equal)
∠ BOD = 60°
Let coordinates of B be (q,p)
Then,
BD = p
OD = q
2√3 = p
Therefore, the y coordinate of B = 2
2 = q
Therefore, the x coordinate of B = 2
∴ coordinates of B = (2√3,2)
Hence, the coordinates of the vertices of the triangle are (0,0),(4,0) and(2√3,2)
A large trapezium made up of four equal trapeziums:
Find the coordinates of the vertices of all these trapeziums.
Draw this picture in GeoGebra.
Since, the four trapeziums are equal
OA = AB
∴ A bisects OB
OB = 8
∴ OA = 4
∴coordinates of A = (4,0)[A is on X axis]
And coordinates of B = (8,0)[B is on X axis]
BC is parallel to Y – axis,
∴ X coordinate will remain constant
∴ X coordinate of C = 8
Since all four trapeziums are equal,
BC = OA = 4 = Y coordinate of C
∴ Y coordinate of C = 4
∴coordinates of C = (8,4)
AF = GD[All trapeziums are equal]
AF + GD = BC = 4
∴ AF = GD = 2
AF = Y coordinate of F = 2
Line AF is parallel to Y – axis,
∴ X coordinate will remain constant.
∴ X coordinate of F = 4
∴coordinates of F = (4,2)
Line FG is parallel to X – axis,
∴ Y coordinate will remain constant
∴ Y coordinate of G = 2
FG = DC[All trapeziums are equal]
FG + DC = AB = 4
∴ FG = DC = 2
X coordinate of G = X coordinate of F + FG
= 4 + 2 = 6
∴coordinates of G = (6,2)
CD is parallel to X – axis,
∴ Y coordinate will remain constant
∴ Y coordinate of D = 4
GD is parallel to Y – axis,
∴ X coordinate will remain constant
∴ X coordinate of D = 6
∴coordinates of D = (6,4)
CI is parallel to X axis
∴ Y coordinate will remain constant
∴ Y coordinate of I = 4
AI us parallel to Y – axis,
∴ X coordinate will remain constant
∴ X coordinate of I = 4
∴coordinates of I = (4,4)
OH and HI will be equal in length and will be at equal angles with X axis[All trapeziums are equal]
∴ H will be the midpoint of OI
∴ H will be the mid point of(0,0) and (4,4)
∴coordinates of H = (2,2)
All rectangles below have sides parallel to the axes. Find the coordinates of the remaining vertices of each.
Coordinates of A = (– 2,3)
Coordinates of C = (2,4)
Line AB is parallel to X – axis ,
∴ Y coordinate will remain constant.
∴ Y – coordinate of B = 3
Line BC is parallel to Y – axis ,
∴ X coordinate will remain constant.
∴ X coordinate of B = 2
∴coordinates of B = (2,3)
Line AD is parallel to Y – axis ,
∴ X coordinate will remain constant.
∴ X coordinate of D = – 2
Line CD is parallel to X – axis ,
∴ Y coordinate will remain constant.
∴ Y coordinate of D = 4
∴coordinates of D = (– 2,4)
Hence, the remaining vertices of the rectangle are (2,3),(– 2,4).
All rectangles below have sides parallel to the axes. Find the coordinates of the remaining vertices of each.
Coordinates of A = (2, – 4)
Coordinates of C = (– 1, – 2)
Line AB is parallel to X – axis ,
∴ Y coordinate will remain constant.
∴ Y – coordinate of B = – 4
Line BC is parallel to Y – axis ,
∴ X coordinate will remain constant.
∴ X coordinate of B = – 1
∴coordinates of B = (– 1, – 4)
Line AD is parallel to Y – axis ,
∴ X coordinate will remain constant.
∴ X coordinate of D = 2
Line CD is parallel to X – axis ,
∴ Y coordinate will remain constant.
∴ Y coordinate of D = – 2
∴coordinates of D = (2, – 2)
Hence, the remaining vertices of the rectangle are (– 1, – 4) and (2, – 2).
All rectangles below have sides parallel to the axes. Find the coordinates of the remaining vertices of each.
Coordinates of A = (– 1,3)
Coordinates of C = (2,6)
Line AB is parallel to X – axis ,
∴ Y coordinate will remain constant.
∴ Y – coordinate of B = 3
Line BC is parallel to Y – axis ,
∴ X coordinate will remain constant.
∴ X coordinate of B = 2
∴coordinates of B = (2,3)
Line AD is parallel to Y – axis ,
∴ X coordinate will remain constant.
∴ X coordinate of D = – 1
Line CD is parallel to X – axis ,
∴ Y coordinate will remain constant.
∴ Y coordinate of D = 6
∴coordinates of D = (– 1,6)
Hence, the remaining vertices of the rectangle are (2,3) and (– 1,6).
Without drawing coordinates axes, mark each pair of points below with left – right, top – bottom position correct. Find the other coordinates of the rectangles drawn with these as opposite vertices and sides parallel to the axes.
(3, 5), (7, 8)
Steps for marking the given points:
1) Mark Point (3,5) anywhere.
2) Move (7 – 3) = 4 units right.
3) Move (8 – 5) = 3 units up.
4) Mark the point at the current position.
Since sides of the rectangle are parallel to coordinate axes,
Their equations will be
x = 3
x = 7
y = 5
y = 8
Point of intersection of x = 3 and y = 5 is (3,5) [Given point]
Point of intersection of x = 3 and y = 8 is (3,8)
Point of intersection of x = 7 and y = 5 is (7,5)
Point of intersection of x = 7 and y = 8 is (7,8) [Given point]
Hence, the coordinates of the other vertices of the rectangle are (3,8) and (7,5)
Without drawing coordinates axes, mark each pair of points below with left – right, top – bottom position correct. Find the other coordinates of the rectangles drawn with these as opposite vertices and sides parallel to the axes.
(6, 2), (5, 4)
Steps for marking the given points:
1) Mark Point (6,2) anywhere.
2) Move (5 – 6) = – 1 unit right, i.e. 1 unit left.
3) Move (4 – 2) = 2 units up.
4) Mark the point at the current position.
Since sides of the rectangle are parallel to coordinate axes,
Their equations will be
x = 6
x = 5
y = 2
y = 4
Point of intersection of x = 6 and y = 2 is (6,2) [Given point]
Point of intersection of x = 5 and y = 2 is (5,2)
Point of intersection of x = 6 and y = 4 is (6,4)
Point of intersection of x = 5 and y = 4 is (5,4) [Given point]
Hence, the coordinates of the other vertices of the rectangle are (5,2) and (6,4)
Without drawing coordinates axes, mark each pair of points below with left – right, top – bottom position correct. Find the other coordinates of the rectangles drawn with these as opposite vertices and sides parallel to the axes.
(– 3, 5), (– 7, 1)
Steps for marking the given points:
1) Mark Point (– 3,5) anywhere.
2) Move (– 7 – (– 3)) = – 4 units right i.e. 4 units left.
3) Move (1 – 5) = – 4 units up i.e. 4 units down.
4) Mark the point at the current position.
Since sides of the rectangle are parallel to coordinate axes,
Their equations will be
x = – 3
x = – 7
y = 5
y = 1
Point of intersection of x = – 3 and y = 5 is (3,5) [Given point]
Point of intersection of x = – 7 and y = 5 is (– 7,5)
Point of intersection of x = – 3 and y = 1 is (– 3,1)
Point of intersection of x = – 7 and y = 1 is (– 7,1) [Given point]
Hence, the coordinates of the other vertices of the rectangle are (– 3,1) and (– 7,5)
Without drawing coordinates axes, mark each pair of points below with left – right, top – bottom position correct. Find the other coordinates of the rectangles drawn with these as opposite vertices and sides parallel to the axes.
(– 1, – 2), (– 5, – 4)
Steps for marking the given points:
1) Mark Point (– 1, – 2) anywhere.
2) Move (– 5 – (– 1)) = – 4 units right i.e. 4 units left.
3) Move (– 4 – (– 2)) = – 2 units up i.e. 2 units down.
4) Mark the point at the current position.
Since sides of the rectangle are parallel to coordinate axes,
Their equations will be
x = – 1
x = – 5
y = – 2
y = – 4
Point of intersection of x = – 1 and y = – 2 is (– 1, – 2) [Given point]
Point of intersection of x = – 1 and y = – 4 is (– 1, – 4)
Point of intersection of x = – 5 and y = – 2 is (– 5, – 2)
Point of intersection of x = – 5 and y = – 4 is (– 5, – 4) [Given point]
Hence, the coordinates of the other vertices of the rectangle are (– 1, – 4) and (– 5, – 2)
Calculate the length of the sides and diagonals of the quadrilateral below:
Let A = (0,0)
B = (1, – 2)
C = (– 3, – 2)
D = (– 3,1)
Here, AB, BC, CD, DA are the sides of the quadrilateral and AC and BD are the diagonals of the quadrilateral.
Length of Side
AB = distance between point A and B =
Here x2 = 1,y2 = – 2,x1 = 0,y1 = 0
∴ AB =
∴ AB =
∴ AB =
∴AB = √5unit
BC = distance between point B and C =
Here x2 = – 3,y2 = – 2,x1 = 1,y1 = – 2
∴ BC =
∴ BC =
∴ BC =
∴BC = 2 units
CD = distance between point C and D =
Here x2 = – 3,y2 = 1,x1 = – 3,y1 = – 2
∴ CD =
∴ CD =
∴ CD =
∴CD = 3 units
DA = distance between point D and A =
Here x2 = 0,y2 = 0,x1 = – 3,y1 = 1
∴ DA =
∴ DA =
∴ DA =
∴DA = √10 units
Length of diagonal
AC = distance between point A and C =
Here x2 = – 3,y2 = – 2,x1 = 0,y1 = 0
∴ AC =
∴ AC =
∴ AC =
∴AC = √13 units
Length of diagonal
BD = distance between point B and D =
Here x2 = – 3,y2 = 1,x1 = 1,y1 = – 2
∴ BD =
∴ BD =
∴ BD =
∴BD = 5 units
Hence, length of the sides of the quadrilateral is √5,2,3,√10 units.
Length of the diagonals of the quadrilateral are √13 and 5 units.
Prove that by joining the point (2, 1), (3, 4), (– 3, 6) we get a right triangle.
Let A = (2,1)
B = (3,4)
C = (– 3,6)
Length of Side
AB = distance between point A and B =
Here x2 = 3,y2 = 4,x1 = 2,y1 = 1
∴ AB =
∴ AB =
∴ AB =
∴AB = √10 units
BC = distance between point B and C =
Here x2 = – 3,y2 = 6,x1 = 3,y1 = 4
∴ BC =
∴ BC =
∴ BC =
∴BC = √40units
CA = distance between point C and A =
Here x2 = 2,y2 = 1,x1 = – 3,y1 = 6
∴ CA =
∴ CA =
∴ CA =
∴CA = √50 units
Here CA is the largest side.
For ΔABC to be right angled triangle
Here,
And
50 = 50
⇒
∴ the given triangle is a right – angled triangle.
Hence Proved.
A circle of radius 10 is drawn with the origin as the centre.
i) Check whether each of the points with coordinates (6, 9), (5, 9), (6, 8) is inside, outside or on the circle.
ii) Write the coordinates of 8 points on this circle.
(i) [If the distance between the centre and the point is greater than Radius, then the point is outside the circle.
If the distance between the centre and the point is smaller than Radius, then the point is inside the circle.
If the distance between the centre and the point is equal to Radius, then the point is on the circle.]
Centre of the circle = (0,0)(given)
Radius = 10
The distance between origin and (6,9) = = √117>10
⇒ Point (6,9) is outside the circle.
The distance between origin and (5,9) = = √106>10
⇒ Point (5,9) is outside the circle.
The distance between origin and (6,8) = = √100 = 10
⇒ Point (6,8) is outside the circle.
(ii) Let the coordinates of the point on the circle be (x,y)
Then, distance of it from the origin(center) = 10
⇒ = 10
⇒ = 10
⇒
All the possible solutions of the above equation will be on the circle.
Such 8 points are,(6,8),
(√10,√90),
(√20,√80),
(√30,√70),
(√40,√60),
(√50,√50),
(√60,√40),
(√70,√30).
Find the coordinates of the points where a circle of radius , centered on the point with coordinates (1, 1) cut the axes.
Let the coordinates of the required point is (x, y).
Since the point is on the circle,
Its distance from the centre(1,1) = Radius =
⇒ = √2
⇒ (x – 1)2 + (y – 1)2 = 2
If the point is on X axis,
y = 0
⇒ (x – 1)2 + (0 – 1)2 = 2
⇒ (x – 1)2 + 1 = 2
⇒ (x – 1)2 = 1
⇒ x – 1 = 1 or x – 1 = – 1
⇒ x = 2 or x = 0
Hence, coordinates of the points where a circle of radius √2, centred on the point with coordinates (1, 1) cut the axis are (2,0)and (0,0)
If the point is on Y axis,
x = 0
⇒ (0 – 1)2 + (y – 1)2 = 2
⇒ (– 1)2 + (y – 1)2 = 2
⇒ (y – 1)2 = 1
⇒ y – 1 = 1 or y – 1 = – 1
⇒ y = 2 or y = 0
Hence, coordinates of the points where a circle of radius √2, centred on the point with coordinates (1, 1) cut the axis are (0,2)and (0,0)
Hence, the coordinates of the points where a circle of radius√2, centred on the point with coordinates (1, 1) cut the axes are (0,0),(2,0) and (0,2).
The coordinates of the vertices of a triangle are (1, 2),(2, 3), (3, 1). Find the coordinates of the centre of its circumcircle and the circumradius.
Let the centre of the circumcircle be (x,y)
Since, centre of circumcircle is a point which is equidistant from all the points,
(x – 1)2 + (y – 2)2 = (x – 2)2 + (y – 3)2 = (x – 3)2 + (y – 1)2
⇒ x2 + y2 – 2x – 4y + 5 = x2 + y2 – 4x – 6y + 13 = x2 + y2 – 6x – 2y + 10
⇒ – 2x – 4y + 5 = – 4x – 6y + 13 = – 6x – 2y + 10
– 2x – 4y + 5 = – 4x – 6y + 13
⇒ 2x + 2y = 8
⇒ x + y = 4 …….(1)
– 4x – 6y + 13 = – 6x – 2y + 10
⇒ 2x – 4y = – 3…..(2)
Substituting x = 4 – y from eq(1)
2(4 – y) – 4y = – 3
⇒ 8 – 2y – 4y = – 3
⇒ 8 – 6y = – 3
⇒ – 6y = – 11
⇒
And
x = 4 – y
⇒
Hence coordinates of the centre of the circumcircle of the triangle =)
And its radius =
=
=units.
The centre of the circle below is the origin and A, B are points on it.
Calculate the length of the chord AB.
Let coordinates of A be (x1,y1) and coordinates of B be(x2,y2).
Drop a perpendicular from A on X – axis intersecting X axis at P.
Now,
In Δ OPA
And
⇒ x1 = √3
∴ coordinates of A = (√3)
Drop a perpendicular from B on X – axis intersecting X axis at Q.
Now,
In Δ OQB
And
∴ coordinates of B = (– 1,√3)
Hence, length of the chord AB =
The distance between point A and B =
= √8 = √2