Class 12: Maths Chapter 13 solutions. Complete Class 12 Maths Chapter 13 Notes.
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RD Sharma Solutions for Class 12 Maths Chapter 13–Derivatives as a Rate Measurer
RD Sharma 12th Maths Chapter 13, Class 12 Maths Chapter 13 solutions
Exercise 13.1 Page No: 13.4
1. Find the rate of change of the total surface area of a cylinder of radius r and height h, when the radius varies.
Solution:
2. Find the rate of change of the volume of a sphere with respect to its diameter.
Solution:
3. Find the rate of change of the volume of a sphere with respect to its surface area when the radius is 2 cm.
Solution:
4. Find the rate of change of the area of a circular disc with respect to its circumference when the radius is 3 cm.
Solution:
5. Find the rate of change of the volume of a cone with respect to the radius of its base.
Solution:
Exercise 13.2 Page No: 13.19
1. The side of a square sheet is increasing at the rate of 4 cm per minute. At what rate is the area increasing when the side is 8 cm long?
Solution:
Given the side of a square sheet is increasing at the rate of 4 cm per minute.
To find rate of area increasing when the side is 8 cm long
Let the side of the given square sheet be x cm at any instant time.
Then according to the given question, we can write as
2. An edge of a variable cube is increasing at the rate of 3 cm per second. How fast is the volume of the cube increasing when the edge is 1 cm long?
Solution:
Given the edge of a variable cube is increasing at the rate of 3 cm per second.
To find rate of volume of the cube increasing when the edge is 1 cm long
Let the edge of the given cube be x cm at any instant time.
Then according to the given question we can write as
3. The side of a square is increasing at the rate of 0.2 cm/sec. Find the rate of increase of the perimeter of the square.
Solution:
Given the side of a square is increasing at the rate of 0.2 cm/sec.
To find rate of increase of the perimeter of the square
Let the edge of the given cube be x cm at any instant time.
Then according to the given question, we can write as
4. The radius of a circle is increasing at the rate of 0.7 cm/sec. What is the rate of increase of its circumference?
Solution:
Given the radius of a circle is increasing at the rate of 0.7 cm/sec.
To find rate of increase of its circumference
Let the radius of the given circle be r cm at any instant time.
Then according to the given question, we can write as
Hence the rate of increase of the circle’s circumference will be 1.4 π cm/sec
5. The radius of a spherical soap bubble is increasing at the rate of 0.2 cm/sec. Find the rate of increase of its surface area, when the radius is 7 cm.
Solution:
Given the radius of a spherical soap bubble is increasing at the rate of 0.2 cm/sec.
To find rate of increase of its surface area, when the radius is 7 cm
Let the radius of the given spherical soap bubble be r cm at any instant time.
Then according to the given question we can write as
Rate of radius of the spherical soap bubble is increasing
Hence the rate of increase of its surface area, when the radius is 7 cm is 11.2 π cm2/sec
6. A balloon which always remains spherical is being inflated by pumping in 900 cubic centimetres of gas per second. Find the rate at which the radius of the balloon is increasing when the radius is 15 cm.
Solution:
Given spherical balloon inflated by pumping in 900 cubic centimetres of gas per second
To find the rate at which the radius of the balloon is increasing when the radius is 15 cm
Let the radius of the given spherical balloon be r cm and let V be the volume of the spherical balloon at any instant time
Then according to the given question,
As the balloon is inflated by pumping 900 cubic centimetres of gas per second hence the rate of volume of the spherical balloon increases by
7. The radius of an air bubble is increasing at the rate of 0.5 cm/sec. At what rate is the volume of the bubble increasing when the radius is 1 cm?
Solution:
Given radius of an air bubble is increasing at the rate of 0.5 cm/sec
To find the rate at which the volume of the bubble increasing when the radius is 1 cm
Let the radius of the given air bubble be r cm and let V be the volume of the air bubble at any instant time
Then according to the given question,
8. A man 2 metres high walks at a uniform speed of 5 km/hr. away from a lamp – post 6 metres high. Find the rate at which the length of his shadow increases.
Solution:
Given a man 2 metres high walks at a uniform speed of 5 km/hr. away from a lamp – post 6 metres high
To find the rate at which the length of his shadow increases
Let AB be the lamp post and let MN be the man of height 2m.
Let AL = l meter and MS be the shadow of the man
Let length of the shadow MS = s (as shown in the below figure)
Hence the rate at which the length of his shadow increases by 2.5 km/hr. and it is independent to the current distance of the man from the base of the light.
9. A stone is dropped into a quiet lake and waves move in circles at a speed of 4 cm/sec. At the instant when the radius of the circular wave is 10 cm, how fast is the enclosed area increasing?
Solution:
Given a stone is dropped into a quiet lake and waves move in circles at a speed of 4 cm/sec.
To find the instant when the radius of the circular wave is 10 cm, how fast is the enclosed area increasing
Let r be the radius of the circle and A be the area of the circle
When stone is dropped into the lake waves moves in circle at speed of 4cm/sec. i.e., radius of the circle increases at a rate of 4cm/sec
10. A man 160 cm tall walks away from a source of light situated at the top of a pole 6 m high, at the rate of 1.1m/sec. How fast is the length of his shadow increasing when he is 1m away from the pole?
Solution:
Given a man 160cm tall walks away from a source of light situated at the top of a pole 6 m high, at the rate of 1.1m/sec
To find the rate at which the length of his shadow increases when he is 1m away from the pole
Let AB be the lamp post and let MN be the man of height 160cm or 1.6m.
Let AL = l meter and MS be the shadow of the man
Let length of the shadow MS = s (as shown in the below figure)
Hence the rate at which the length of his shadow increases by 0.4 m/sec, and it is independent to the current distance of the man from the base of the light.
11. A man 180 cm tall walks at a rate of 2 m/sec. away, from a source of light that is 9 m above the ground. How fast is the length of his shadow increasing when he is 3 m away from the base of light?
Solution:
Given a man 180cm tall walks at a rate of 2 m/sec away; from a source of light that is 9 m above the ground
To find the rate at which the length of his shadow increases when he is 3m away from the pole
Let AB be the lamp post and let MN be the man of height 180cm or 1.8m.
Let AL = l meter and MS be the shadow of the man
Let length of the shadow MS = s (as shown in the below figure)
ds/dt = 0.57m/sec
Hence the rate at which the length of his shadow increases by 0.57 m/sec, and it is independent to the current distance of the man from the base of the light.
12. A ladder 13 m long leans against a wall. The foot of the ladder is pulled along the ground away from the wall, at the rate of 1.5m/sec. How fast the angle θ between the ladder and the ground is is changing when the foot of the ladder is 12 m away from the wall.
Solution:
Given a ladder 13 m long leans against a wall. The foot of the ladder is pulled along the ground away from the wall, at the rate of 1.5m/sec
To find how fast is the angle θ between the ladder and the ground is changing when the foot of the ladder is 12 m away from the wall
Let AC be the position of the ladder initially, then AC = 13m.
DE be the position of the ladder after being pulled at the rate of 1.5m/sec, then DE = 13m as shown in the below figure.
Hence the angle θ between the ladder and the ground is changing at the rate of 0.3 rad/sec (because angle cannot be negative) when the foot of the ladder is 12 m away from the wall.
13. A particle moves along the curve y = x2 + 2x. At what point(s) on the curve are the x and y coordinates of the particle changing at the same rate?
Solution:
Given a particle moves along the curve y = x2 + 2x.
To find the points at which the curve are the x and y coordinates of the particle changing at the same rate
Equation of curve is y = x2 + 2x
Differentiating the above equation with respect to x, we get
dy/dx = [d(x2 + 2x)]/dx
14. If y = 7x – x3 and x increases at the rate of 4 units per second, how fast is the slope of the curve changing when x = 2?
Solution:
Given equation of curve y = 7x – x3 and x increases at the rate of 4 units per second.
To find how fast is the slope of the curve changing when x = 2
Equation of curve is y = 7x – x3
Differentiating the above equation with respect to x, we get slope of the curve
The slope cannot be negative,
Hence the slope of the curve is changing at the rate of 48 units/sec when x = 2
15. A particle moves along the curve y = x3. Find the points on the curve at which the y – coordinate changes three times more rapidly than the x – coordinate.
Solution:
Given a particle moves along the curve y = x3.
To find the points on the curve at which the y – coordinate changes three times more rapidly than the x – coordinate
Equation of curve is y = x3
Differentiating the above equation with respect to t, we get
When x = 1, y = x3 = (1)3⇒ y = 1
When x = – 1, y = x3 = (- 1)3⇒ y = – 1
Hence the points on the curve at which the y – coordinate changes three times more rapidly than the x – coordinate are (1, 1) and ( – 1, – 1).
RD Sharma Solutions for Class 12 Maths Chapter 13: Download PDF
RD Sharma Solutions for Class 12 Maths Chapter 13–Derivatives as a Rate Measurer
Download PDF: RD Sharma Solutions for Class 12 Maths Chapter 13–Derivatives as a Rate Measurer PDF
Chapterwise RD Sharma Solutions for Class 12 Maths :
- Chapter 1–Relation
- Chapter 2–Functions
- Chapter 3–Binary Operations
- Chapter 4–Inverse Trigonometric Functions
- Chapter 5–Algebra of Matrices
- Chapter 6–Determinants
- Chapter 7–Adjoint and Inverse of a Matrix
- Chapter 8–Solution of Simultaneous Linear Equations
- Chapter 9–Continuity
- Chapter 10–Differentiability
- Chapter 11–Differentiation
- Chapter 12–Higher Order Derivatives
- Chapter 13–Derivatives as a Rate Measurer
- Chapter 14–Differentials, Errors and Approximations
- Chapter 15–Mean Value Theorems
- Chapter 16–Tangents and Normals
- Chapter 17–Increasing and Decreasing Functions
- Chapter 18–Maxima and Minima
- Chapter 19–Indefinite Integrals
About RD Sharma
RD Sharma isn’t the kind of author you’d bump into at lit fests. But his bestselling books have helped many CBSE students lose their dread of maths. Sunday Times profiles the tutor turned internet star
He dreams of algorithms that would give most people nightmares. And, spends every waking hour thinking of ways to explain concepts like ‘series solution of linear differential equations’. Meet Dr Ravi Dutt Sharma — mathematics teacher and author of 25 reference books — whose name evokes as much awe as the subject he teaches. And though students have used his thick tomes for the last 31 years to ace the dreaded maths exam, it’s only recently that a spoof video turned the tutor into a YouTube star.
R D Sharma had a good laugh but said he shared little with his on-screen persona except for the love for maths. “I like to spend all my time thinking and writing about maths problems. I find it relaxing,” he says. When he is not writing books explaining mathematical concepts for classes 6 to 12 and engineering students, Sharma is busy dispensing his duty as vice-principal and head of department of science and humanities at Delhi government’s Guru Nanak Dev Institute of Technology.