Chapter 10.1: Introduction
- Conic Section: The curve formed by the intersection of a plane with a double cone.
- Types of Conic Sections: Circle, ellipse, parabola, and hyperbola.
Chapter 10.2: The Circle
- Equation of a Circle: (x – h)^2 + (y – k)^2 = r^2, where (h, k) is the center and r is the radius.
- Standard Form: x^2 + y^2 + 2gx + 2fy + c = 0
- Center and Radius: Center is (-g, -f) and radius is √(g^2 + f^2 – c).
Chapter 10.3: The Parabola
- Equation of a Parabola: y^2 = 4ax (vertical axis) or x^2 = 4ay (horizontal axis)
- Vertex: (0, 0)
- Axis: Line y = 0 (vertical axis) or x = 0 (horizontal axis)
- Focus: (a, 0) or (0, a)
- Directrix: x = -a or y = -a
Chapter 10.4: The Ellipse
- Equation of an Ellipse: x^2/a^2 + y^2/b^2 = 1 (standard form)
- Center: (0, 0)
- Vertices: (±a, 0) and (0, ±b)
- Foci: (±√(a^2 – b^2), 0) or (0, ±√(a^2 – b^2))
- Eccentricity: e = √(a^2 – b^2) / a
Chapter 10.5: The Hyperbola
- Equation of a Hyperbola: x^2/a^2 – y^2/b^2 = 1 (horizontal axis) or y^2/b^2 – x^2/a^2 = 1 (vertical axis)
- Center: (0, 0)
- Vertices: (±a, 0) or (0, ±b)
- Foci: (±√(a^2 + b^2), 0) or (0, ±√(a^2 + b^2))
- Eccentricity: e = √(a^2 + b^2) / a
- Asymptotes: y = ±(b/a)x
Key Concepts:
- Properties of conic sections
- Equations of conic sections
- Graphs of conic sections
- Applications of conic sections (e.g., optics, astronomy)
Exercise 10.1
In each of the following Exercises 1 to 5, find the equation of the circle with
1. centre (0,2) and radius 2
Ans:
(x – h)^2 + (y – k)^2 = r^2
In this case, the center is (0, 2) and the radius is 2. Substituting these values into the equation:
(x – 0)^2 + (y – 2)^2 = 2^2
Simplifying:
x^2 + y^2 – 4y + 4 = 4
x^2 + y^2 – 4y = 0
2. centre (–2,3) and radius 4
Ans :
(x – h)^2 + (y – k)^2 = r^2
Substituting these values into the equation:
(x – (-2))^2 + (y – 3)^2 = 4^2
(x + 2)^2 + (y – 3)^2 = 16
Expanding the equation:
x^2 + 4x + 4 + y^2 – 6y + 9 = 16
x^2 + y^2 + 4x – 6y – 3 = 0
3. Centre (1/2, 1/4 ) and radius 1/12
Ans :
(x – h)^2 + (y – k)^2 = r^2
In this case, the center is (1/2, 1/4) and the radius is 1/12. Substituting these values into the equation:
(x – 1/2)^2 + (y – 1/4)^2 = (1/12)^2
Expanding the equation:
x^2 – x + 1/4 + y^2 – y/2 + 1/16 = 1/144
Multiplying both sides by 144:
144x^2 – 144x + 36 + 144y^2 – 72y + 9 = 1
144x^2 + 144y^2 – 144x – 72y + 44 = 0
4. Centre (1,1) and radius 2
Ans :
(x – h)^2 + (y – k)^2 = r^2
In this case, the center is (1, 1) and the radius is 2. Substituting these values into the equation:
(x – 1)^2 + (y – 1)^2 = 2^2
Expanding the equation:
x^2 – 2x + 1 + y^2 – 2y + 1 = 4
x^2 + y^2 – 2x – 2y – 2 = 0
5. centre (–a, –b) and radius a2–b2
Ans :
In each of the following Exercises 6 to 9, find the centre and radius of the circles.
6. (x + 5)2 + (y – 3)2 = 36
Ans :
The given equation is already in the standard form of a circle:
(x – h)^2 + (y – k)^2 = r^2
where (h, k) is the center of the circle and r is its radius.
Comparing the given equation with the standard form, we can see that:
- h = -5
- k = 3
- r^2 = 36
Therefore, the center of the circle is (-5, 3) and its radius is √36 = 6 units.
7. x 2 + y 2 – 4x – 8y – 45 = 0
Ans :
The given equation is:
x^2 + y^2 – 4x – 8y – 45 = 0
(x – h)^2 + (y – k)^2 = r^2
To do this, we can complete the square for both the x and y terms:
x^2 – 4x + 4 + y^2 – 8y + 16 – 45 = 0 + 4 + 16
(x – 2)^2 + (y – 4)^2 – 25 = 0
(x – 2)^2 + (y – 4)^2 = 25
Comparing this equation to the standard form, we can see that:
- h = 2
- k = 4
- r^2 = 25
Therefore, the center of the circle is (2, 4) and its radius is √25 = 5 units.
8. x 2 + y 2 – 8x + 10y – 12 = 0
Ans :
The given equation is:
x^2 + y^2 – 8x + 10y – 12 = 0
(x – h)^2 + (y – k)^2 = r^2
To do this, we can complete the square for both the x and y terms:
x^2 – 8x + 16 + y^2 + 10y + 25 – 12 = 0 + 16 + 25
(x – 4)^2 + (y + 5)^2 – 43 = 0
(x – 4)^2 + (y + 5)^2 = 43
- h = 4
- k = -5
- r^2 = 43
Therefore, the center of the circle is (4, -5) and its radius is √43 units.
9. 2x 2 + 2y 2 – x = 0
Ans :
To find the center and radius of the circle represented by the equation 2x^2 + 2y^2 – x = 0, we need to convert it into the standard form of a circle’s equation:
(x – h)^2 + (y – k)^2 = r^2
Steps:
- Divide the entire equation by 2 to simplify:
- x^2 + y^2 – x/2 = 0
- Rearrange to group the x terms:
- x^2 – x/2 + y^2 = 0
- Complete the square for the x terms:
- To complete the square, add and subtract (1/4)^2 (the square of half the coefficient of x):
- x^2 – x/2 + (1/4)^2 – (1/4)^2 + y^2 = 0
- To complete the square, add and subtract (1/4)^2 (the square of half the coefficient of x):
- Rewrite the equation:
- (x – 1/4)^2 + y^2 = (1/4)^2
Now, the equation is in standard form.
Center: (1/4, 0) Radius: √(1/4)^2 = 1/4
Therefore, the center of the circle is (1/4, 0) and its radius is 1/4.
10. Find the equation of the circle passing through the points (4,1) and (6,5) and whose centre is on the line 4x + y = 16.
Ans :
11. Find the equation of the circle passing through the points (2,3) and (–1,1) and whose centre is on the line x – 3y – 11 = 0.
Ans :
Since the circle passes through the points (2, 3) and (-1, 1), we have:
(2 – h)^2 + (3 – k)^2 = (h + 1)^2 + (k – 1)^2
Expanding and simplifying:
h^2 – 4h + k^2 – 6k + 13 = h^2 + 2h + k^2 – 2k + 2
-6h – 4k + 11 = 0
3h + 2k – 11/2 = 0
Since the center lies on the line x – 3y – 11 = 0, we also have:
h – 3k – 11 = 0
Now, we have two equations:
3h + 2k – 11/2 = 0 h – 3k – 11 = 0
Solving these equations simultaneously, we get:
h = 7/2 k = -5/2
Therefore, the center of the circle is (7/2, -5/2).
To find the radius, we can use the distance between the center and any of the given points:
Radius = √((2 – 7/2)^2 + (3 – (-5/2))^2)
Radius = √((-1/2)^2 + (11/2)^2)
Radius = √(122/4)
Radius = √30.5
Finally, the equation of the circle is:
(x – 7/2)^2 + (y + 5/2)^2 = 30.5
12. Find the equation of the circle with radius 5 whose centre lies on x-axis and passes through the point (2,3).
Ans :
Let the center of the circle be (a, 0), since it lies on the x-axis.
The radius of the circle is given as 5 units.
Using the distance formula, we can write the equation:
(x – a)^2 + (y – 0)^2 = 5^2
(x – a)^2 + y^2 = 25
Since the circle passes through the point (2, 3), substituting these values in the equation:
(2 – a)^2 + 3^2 = 25
4 – 4a + a^2 + 9 = 25
a^2 – 4a – 12 = 0
Factoring the equation:
(a – 6)(a + 2) = 0
Therefore, the possible values for a are 6 and -2.
So, there are two circles that satisfy the given conditions:
- Center: (6, 0), Radius: 5 Equation: (x – 6)^2 + y^2 = 25
- Center: (-2, 0), Radius: 5 Equation: (x + 2)^2 + y^2 = 25
13. Find the equation of the circle passing through (0,0) and making intercepts a and b on the coordinate axes.
Ans :
(0 – h)^2 + (0 – k)^2 = r^2
h^2 + k^2 = r^2
This means that the points (a, 0) and (0, b) lie on the circle.
Substituting (a, 0) into the equation of the circle:
(a – h)^2 + (0 – k)^2 = r^2
a^2 – 2ah + h^2 + k^2 = r^2
Since h^2 + k^2 = r^2 (from the first equation), we can substitute r^2:
a^2 – 2ah + r^2 = r^2
a^2 – 2ah = 0
a(a – 2h) = 0
Therefore, either a = 0 or a = 2h.
Similarly, substituting (0, b) into the equation of the circle:
(0 – h)^2 + (b – k)^2 = r^2
h^2 + b^2 – 2bk + k^2 = r^2
Since h^2 + k^2 = r^2, we can substitute r^2:
h^2 + b^2 – 2bk + r^2 = r^2
b^2 – 2bk = 0
b(b – 2k) = 0
Therefore, either b = 0 or b = 2k.
Now, we have four possible cases:
- a = 0 and b = 0: This means the circle is centered at the origin, and its equation is x^2 + y^2 = r^2. Since it passes through (a, 0), the radius is a. So the equation is x^2 + y^2 = a^2.
- a = 0 and b = 2k: In this case, the center is (0, k) and the radius is k. The equation of the circle is x^2 + (y – k)^2 = k^2.
- a = 2h and b = 0: In this case, the center is (h, 0) and the radius is h. The equation of the circle is (x – h)^2 + y^2 = h^2.
- a = 2h and b = 2k: In this case, the center is (h, k) and the radius is √(h^2 + k^2). The equation of the circle is (x – h)^2 + (y – k)^2 = h^2 + k^2.
Since the circle passes through the origin, the radius must be equal to the distance between the origin and the center. Therefore, in all cases, r = √(h^2 + k^2).
Combining the four cases, we can say that the equation of the circle passing through (0, 0) and making intercepts a and b on the coordinate axes is:
x^2 + y^2 – ax – by = 0
14. Find the equation of a circle with centre (2,2) and passes through the point (4,5).
Ans :
(x – h)^2 + (y – k)^2 = r^2
In this case, the center is (2, 2). To find the radius, we can use the distance formula between the center and the point (4, 5):
r = √((4 – 2)^2 + (5 – 2)^2) = √(4 + 9) = √13
(x – 2)^2 + (y – 2)^2 = (√13)^2
(x – 2)^2 + (y – 2)^2 = 13
Expanding the equation:
x^2 – 4x + 4 + y^2 – 4y + 4 = 13
x^2 + y^2 – 4x – 4y – 5 = 0
Therefore, the equation of the circle passing through the point (4, 5) with center (2, 2) is:
x^2 + y^2 – 4x – 4y – 5 = 0
15. Does the point (–2.5, 3.5) lie inside, outside or on the circle x 2 + y 2 = 25?
Ans :
First, let’s identify the center and radius of the circle.
The equation x^2 + y^2 = 25 is in the standard form of a circle: (x – h)^2 + (y – k)^2 = r^2, where (h, k) is the center and r is the radius.
Comparing the given equation to the standard form, we can see that:
- h = 0
- k = 0
- r = √25 = 5
So, the circle has its center at (0, 0) and a radius of 5.
Now, let’s determine the distance between the point (-2.5, 3.5) and the center (0, 0).
The distance formula is:
d = √((x2 – x1)^2 + (y2 – y1)^2)
Substituting the coordinates:
d = √((-2.5 – 0)^2 + (3.5 – 0)^2)
d = √(6.25 + 12.25)
d = √18.5
Since 18.5 is less than 25 (the square of the radius), the point (-2.5, 3.5) lies inside the circle.
Exercise 10.2
In each of the following Exercises 1 to 6, find the coordinates of the focus, axis of the parabola, the equation of the directrix and the length of the latus rectum.
1. y2= 12x
Ans :
General Form of a Parabola:
- y^2 = 4ax
- 4a = 12
- a = 3
Therefore, the parabola opens to the right.
Focus:
- The focus of a right-opening parabola is (a, 0).
- So, the focus is (3, 0).
Axis of the Parabola:
- Since the vertex is (0, 0), the axis of symmetry is the y-axis.
- Equation of the axis: x = 0
Directrix:
- The directrix of a right-opening parabola is a vertical line x = -a.
- So, the equation of the directrix is x
- = -3.
Length of the Latus Rectum:
- So, the length of the latus rectum is 4 * 3 = 12.
Summary:
- Focus: (3, 0)
- Axis of the Parabola: x = 0
- Equation of the Directrix: x = -3
- Length of the Latus Rectum: 12
2. x2= 6y
Ans :
3. y2= -8x
Ans :
Key points:
- Axis of symmetry: x-axis
- Vertex: (0, 0)
- Opens left (since the coefficient of x is negative)
To find the focus and directrix:
- 4a = -8 (comparing with the standard form y^2 = 4ax)
- a = -2
- Focus: (-a, 0) = (-2, 0)
- Directrix: x = a = 2
Therefore, the parabola y^2 = -8x has:
- Vertex: (0, 0)
- Axis of symmetry: x-axis
- Focus: (-2, 0)
- Directrix: x = 2
4. x2= -16y
Ans :
5. y2= 10x
Ans :
The given equation is y^2 = 10x. This represents a parabola.
Key points:
- Axis of symmetry: y-axis
- Vertex: (0, 0)
- Opens right (since the coefficient of x is positive)
To find the focus and directrix:
- 4a = 10 (comparing with the standard form y^2 = 4ax)
- a = 5/2
- Focus: (a, 0) = (5/2, 0)
- Directrix: x = -a = -5/2
Therefore, the parabola y^2 = 10x has:
- Vertex: (0, 0)
- Axis of symmetry: y-axis
- Focus: (5/2, 0)
- Directrix: x = -5/2
6. x2= -9y
Ans :
Key points:
- Axis of symmetry: y-axis
- Vertex: (0, 0)
- Opens downward (since the coefficient of y is negative)
To find the focus and directrix:
- 4a = -9
- a = -9/4
- Focus: (0, -a) = (0, 9/4)
- Directrix: y = a = -9/4
Therefore, the parabola x^2 = -9y has:
- Vertex: (0, 0)
- Axis of symmetry: y-axis
- Focus: (0, 9/4)
- Directrix: y = -9/4
In each of the Exercises 7 to 12, find the equation of the parabola that satisfies the given conditions:
7. Focus (6,0); directrix x = – 6
Ans :
Finding the Equation of the Parabola
Given:
- Focus: (6, 0)
- Directrix: x = -6
Analysis:
y^2 = 4ax
Finding the value of a:
- Vertex: ((6 + (-6))/2, 0) = (0, 0)
- This distance is the value of a.
- a = 6
Substituting the value of a into the general equation:
y^2 = 4 * 6 * x
Therefore, the equation of the parabola is:
y^2 = 24x
8. Focus (0,–3); directrix y = 3
Ans :
Given:
- Focus: (0, -3)
- Directrix: y = 3
Analysis:
x^2 = -4ay
Finding the value of a:
- Vertex: ((0 + 0)/2, (-3 + 3)/2) = (0, 0)
- This distance is the value of a.
- a = 3
Substituting the value of a into the general equation:
x^2 = -4 * 3 * y
Therefore, the equation of the parabola is:
x^2 = -12y
9.Vertex (0,0); focus (3,0)
Ans :
Given:
- Vertex: (0, 0)
- Focus: (3, 0)
Analysis:
y^2 = 4ax
Finding the value of a:
- a = 3
Substituting the value of a into the general equation:
y^2 = 4 * 3 * x
Therefore, the equation of the parabola is:
y^2 = 12x
10.Vertex (0,0); focus (–2,0)
Ans :
Given:
- Vertex: (0, 0)
- Focus: (-2, 0)
Analysis:
y^2 = -4ax
Finding the value of a:
- a = 2
Substituting the value of a into the general equation:
y^2 = -4 * 2 * x
Therefore, the equation of the parabola is:
y^2 = -8x
11.Vertex (0,0) passing through (2,3) and axis is along x-axis
Ans :
Given:
- Vertex: (0, 0)
- Axis: Along the x-axis
- Passes through the point (2, 3)
Analysis:
- Since the axis is along the x-axis, the parabola is of the form y^2 = 4ax.
- We need to find the value of a.
Substituting the given point (2, 3) into the equation:
3^2 = 4a * 2
9 = 8a
Solving for a:
a = 9/8
Therefore, the equation of the parabola is:
y^2 = 4 * (9/8) * x
Simplifying:
y^2 = 9/2 * x
12. Vertex (0,0), passing through (5,2) and symmetric with respect to y-axis
Ans :
Given:
- Vertex: (0, 0)
- Passes through the point (5, 2)
- Symmetric with respect to the y-axis
Analysis:
- Since the parabola is symmetric with respect to the y-axis and has its vertex at (0, 0), the general equation of the parabola is of the form x^2 = 4ay.
Substituting the given point (5, 2) into the equation:
5^2 = 4a * 2
25 = 8a
Solving for a:
a = 25 / 8
Substituting the value of a back into the general equation:
x^2 = 4 * (25/8) * y
Simplifying:
x^2 = 25/2 * y
Therefore, the equation of the parabola is:
x^2 = 25/2 * y
Exercise 10.3
1. In each of the Exercises 1 to 9, find the coordinates of the foci, the vertices, the length of major axis, the minor axis, the eccentricity and the length of the latus rectum of the ellipse.
1.
Ans :
Analyzing the Ellipse: x^2/36 + y^2/16 = 1
Standard Form of an Ellipse:
(x^2 / a^2) + (y^2 / b^2) = 1
where:
- a^2 = 36
- b^2 = 16
Finding the Vertices:
- Since a^2 > b^2, the major axis is along the x-axis.
- The vertices are (±a, 0).
- a = √36 = 6
- Vertices: (±6, 0)
Finding the Foci:
- c = √(a^2 – b^2) = √(36 – 16) = √20 = 2√5
- The foci are (±c, 0).
- Foci: (±2√5, 0)
Finding the Length of the Major Axis:
- Length of major axis = 2a = 2 * 6 = 12
Finding the Length of the Minor Axis:
- Length of minor axis = 2b
- = 2 * 4
- = 8
Finding the Eccentricity:
- Eccentricity (e) = c / a = (2√5) / 6 = √5 / 3
Finding the Length of the Latus Rectum:
- Length of latus rectum = 2b^2 / a = 2 * 16 / 6
= 16/3
2.
2.
Ans :
Analyzing the Ellipse: x^2/4 + y^2/25 = 1
Standard Form of an Ellipse:
(x^2 / a^2) + (y^2 / b^2) = 1
where:
- a^2 = 4
- b^2 = 25
Finding the Vertices:
- Since a^2 < b^2, the major axis is along the y-axis.
- The vertices are (0, ±b).
- b = √25 = 5
- Vertices: (0, ±5)
Finding the Foci:
- c = √(b^2 – a^2) = √(25 – 4) = √21
- The foci are (0, ±c).
- Foci: (0, ±√21)
Finding the Length of the Major Axis:
- Length of major axis = 2b = 2 * 5 = 10
Finding the Length of the Minor Axis:
- Length of minor axis = 2a = 2 * 2 = 4
Finding the Eccentricity:
- Eccentricity (e) = c / b = (√21) / 5
Finding the Length of the Latus Rectum:
Length of latus rectum = 2a^2 / b = 2 * 4 / 5 = 8/5
3.
Ans :
Analyzing the Ellipse: x^2/16 + y^2/9 = 1
Standard Form of an Ellipse:
The given equation is already in standard form:
(x^2 / a^2) + (y^2 / b^2) = 1
where:
- a^2 = 16
- b^2 = 9
Finding the Vertices:
- Since a^2 > b^2, the major axis is along the x-axis.
- The vertices are (±a, 0).
- a = √16 = 4
- Vertices: (±4, 0)
Finding the Foci:
- c = √(a^2 – b^2) = √(16 – 9) = √7
- The foci are (±c, 0).
- Foci: (±√7, 0)
Finding the Length of the Major Axis:
- Length of major axis = 2a = 2 * 4 = 8
Finding the Length of the Minor Axis:
- Length of minor axis = 2b = 2 * 3 = 6
Finding the Eccentricity:
- Eccentricity (e) = c / a = (√7) / 4
Finding the Length of the Latus Rectum:
Length of latus rectum = 2b^2 / a = 2 * 9 / 4 = 9/2
4.
Ans :
Analyzing the Ellipse: x^2/25 + y^2/100 = 1
Standard Form of an Ellipse:
(x^2 / a^2) + (y^2 / b^2) = 1
where:
- a^2 = 25
- b^2 = 100
Finding the Vertices:
- Since a^2 < b^2, the major axis is along the y-axis.
- The vertices are (0, ±b).
- b = √100 = 10
- Vertices: (0, ±10)
Finding the Foci:
- c = √(b^2 – a^2) = √(100 – 25) = √75 = 5√3
- The foci are (0, ±c).
- Foci: (0, ±5√3)
Finding the Length of the Major Axis:
- Length of major axis = 2b = 2 * 10 = 20
Finding the Length of the Minor Axis:
- Length of minor axis = 2a = 2 * 5 = 10
Finding the Eccentricity:
- Eccentricity (e) = c / b = (5√3) / 10 = √3 / 2
Finding the Length of the Latus Rectum:
Length of latus rectum = 2a^2 / b = 2 * 25 / 10 = 5
5
Ans :
Analyzing the Ellipse: x^2/49 + y^2/36 = 1
Standard Form of an Ellipse:
(x^2 / a^2) + (y^2 / b^2) = 1
where:
- a^2 = 49
- b^2 = 36
Finding the Vertices:
- Since a^2 > b^2, the major axis is along the x-axis.
- The vertices are (±a, 0).
- a = √49 = 7
- Vertices: (±7, 0)
Finding the Foci:
- c = √(a^2 – b^2) = √(49 – 36) = √13
- The foci are (±c, 0).
- Foci: (±√13, 0)
Finding the Length of the Major Axis:
- Length of major axis = 2a
- = 2 * 7
- = 14
Finding the Length of the Minor Axis:
- Length of minor axis = 2b = 2 * 6 = 12
Finding the Eccentricity:
- Eccentricity (e) = c / a = (√13) / 7
Finding the Length of the Latus Rectum:
Length of latus rectum = 2b^2 / a
= 2 * 36 / 7
6.
Ans :
(x^2 / a^2) + (y^2 / b^2) = 1
where:
- a^2 = 100
- b^2 = 400
Finding the Vertices:
- Since a^2 < b^2, the major axis is along the y-axis.
- The vertices are (0, ±b).
- b = √400 = 20
- Vertices: (0, ±20)
Finding the Foci:
- c = √(b^2 – a^2) = √(400 – 100) = √300 = 10√3
- The foci are (0, ±c).
- Foci: (0, ±10√3)
Finding the Length of the Major Axis:
- Length of major axis = 2b = 2 * 20 = 40
Finding the Length of the Minor Axis:
- Length of minor axis = 2a = 2 * 10 = 20
Finding the Eccentricity:
- Eccentricity (e) = c / b = (10√3) / 20 = √3 / 2
Finding the Length of the Latus Rectum:
- Length of latus rectum = 2a^2 / b = 2 * 100 / 20 = 10
7. 36x2 + 4y2 = 144
Ans :
Step 1: Convert the equation to standard form.
To put the equation in standard form, divide both sides by 144:
(36x^2 / 144) + (4y^2 / 144) = 144 / 144
Simplify:
x^2 / 4 + y^2 / 36 = 1
Step 2: Identify a^2 and b^2.
From the standard form, we can see that:
- a^2 = 4
- b^2 = 36
Step 3: Calculate c.
The value of c (the distance from the center to the foci) is calculated using the formula:
c = √(b^2 – a^2)
Substituting the values:
c = √(36 – 4)
= √32
= 4√2
Step 4: Determine the major and minor axes.
Since a^2 < b^2, the major axis is along the y-axis, and the minor axis is along the x-axis.
- Length of major axis = 2b
- = 2 * √36
- = 12
- Length of minor axis = 2a = 2 * √4 = 4
Step 5: Find the coordinates of the foci, vertices, and other points.
- Vertices: (0, ±b) = (0, ±6)
- Foci: (0, ±c) = (0, ±4√2)
- Eccentricity (e): e = c / b = (4√2) / 6 = 2√2 / 3
- Length of latus rectum: 2a^2 / b = 2 * 4 / 6 = 4/3
8. 162+y2=16
Ans :
Step 1: Convert the equation to standard form.
To put the equation in standard form, divide both sides by 16:
(x^2 / 1) + (y^2 / 16) = 1
Step 2: Identify a^2 and b^2.
- a^2 = 1
- b^2 = 16
Step 3: Calculate c.
The value of c (the distance from the center to the foci) is calculated using the formula:
c = √(b^2 – a^2)
Substituting the values:
c = √(16 – 1) = √15
Step 4: Determine the major and minor axes.
Since a^2 < b^2, the major axis is along the y-axis, and the minor axis is along the x-axis.
- Length of major axis = 2b = 2 * √16 = 8
- Length of minor axis = 2a = 2 * √1 = 2
Step 5: Find the coordinates of the foci, vertices, and other points.
- Vertices: (0, ±b) = (0, ±4)
- Foci: (0, ±c) = (0, ±√15)
- Eccentricity (e): e = c / b = (√15) / 4
- Length of latus rectum: 2a^2 / b
- = 2 * 1 / 4
- = 1/2
9. 4x2 + 9y2 = 36
Ans :
Step 1: Convert the equation to standard form.
To put the equation in standard form, divide both sides by 36:
(4x^2 / 36) + (9y^2 / 36) = 36 / 36
Simplify:
x^2 / 9 + y^2 / 4 = 1
Step 2: Identify a^2 and b^2.
- a^2 = 9
- b^2 = 4
Step 3: Calculate c.
The value of c (the distance from the center to the foci) is calculated using the formula:
c = √(a^2 – b^2)
Substituting the values:
c = √(9 – 4) = √5
Step 4: Determine the major and minor axes.
Since a^2 > b^2, the major axis is along the x-axis, and the minor axis is along the y-axis.
- Length of major axis = 2a = 2 * √9 = 6
- Length of minor axis = 2b = 2 * √4 = 4
Step 5: Find the coordinates of the foci, vertices, and other points.
- Vertices: (±a, 0) = (±3, 0)
- Foci: (±c, 0) = (±√5, 0)
- Eccentricity (e): e = c / a = (√5) / 3
- Length of latus rectum: 2b^2 / a = 2 * 4 / 3 = 8/3
In each of the following Exercises 10 to 20, find the equation for the ellipse that satisfies the given conditions:
10. Vertices (± 5, 0), foci (± 4, 0)
Ans :
Given:
- Vertices: (±5, 0)
- Foci: (±4, 0)
From the vertices, we can determine:
- a = 5
From the foci, we can determine:
- c = 4
- c^2 = a^2 – b^2
- 16 = 25 – b^2
- b^2 = 9
(x^2 / 25) + (y^2 / 9) = 1
11. Vertices (0, ± 13), foci (0, ± 5)
Ans :
Given:
- Vertices: (0, ±13)
- Foci: (0, ±5)
From the vertices, we can determine:
- b = 13
From the foci, we can determine:
- c = 5
- c^2 = b^2 – a^2
- 25 = 169 – a^2
- a^2 = 144
(x^2 / 144) + (y^2 / 169) = 1
Therefore, the equation of the ellipse is:
(x^2 / 144) + (y^2 / 169) = 1
12. Vertices (± 6, 0), foci (± 4, 0)
Ans :
Given:
- Vertices: (±6, 0)
- Foci: (±4, 0)
From the vertices, we can determine:
- a = 6
From the foci, we can determine:
- c = 4
- c^2 = a^2 – b^2
- 16 = 36 – b^2
- b^2 = 20
(x^2 / 36) + (y^2 / 20) = 1
13. Ends of major axis (± 3, 0), ends of minor axis (0, ± 2)
Ans :
Given:
- Ends of major axis: (±3, 0)
- Ends of minor axis: (0, ±2)
From the given points, we can determine:
- a = 3
- b = 2
(x^2 / 9) + (y^2 / 4) = 1
14. Ends of major axis (0, ± 5 ), ends of minor axis (± 1, 0)
Ans :
15. Length of major axis 26, foci (± 5, 0)
Ans :
Given:
- Length of major axis = 26
- Foci: (±5, 0)
- 2a = 26
- a = 13
From the foci, we can determine:
- c = 5
- c^2 = a^2 – b^2
- 25 = 169 – b^2
- b^2 = 144
(x^2 / 169) + (y^2 / 144) = 1
16. Length of minor axis 16, foci (0, ± 6).
Ans :
17. Foci (± 3, 0), a = 4
Ans :
Given:
- Foci: (±3, 0)
- a = 4
From the foci, we can determine:
- c = 3
- c^2 = a^2 – b^2
- 9 = 16 – b^2
- b^2 = 7
(x^2 / 16) + (y^2 / 7) = 1
18. b = 3, c = 4, centre at the origin; foci on the x axis
Ans :
Given:
- b = 3
- c = 4
- Center: (0, 0)
Since the center is at the origin, the standard form remains the same.
- c^2 = a^2 – b^2
- 16 = a^2 – 9
- a^2 = 25
(x^2 / 25) + (y^2 / 9) = 1
19. Centre at (0,0), major axis on the y-axis and passes through the points (3, 2) and (1,6).
Ans :
20. Major axis on the x-axis and passes through the points (4,3) and (6,2).
Ans :
