Class 12 CBSE Applied Maths Differentiation Exercise 5.1

Class 12 CBSE Applied Maths aims to develop an understanding of basic mathematical and statistical tools and their applications in the field of commerce (business/ finance/economics) and social sciences. Topics covered in Class 12th Applied Maths includes : Numbers, Quantification and Numerical Applications, Algebra, Calculus, Probability Distributions , Inferential Statistics, Index Numbers and Time-based data , Financial Mathematics , Linear Programming.

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Find
dy / dx
in the following questions ( 1 to 5) :

Q8. Use implicit differentiation to verify that
dy / dx
.
dx / dy
= 1 when
(i) y² = 4ax
(ii) x³ + y³ = 3axy.

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Q9. If y = √x + √ x + √ x +....∞ prove that (2y - 1)
dy / dx
= 1

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Class 12 CBSE Applied Maths Differentiation Exercise 5.1

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Find dy / dx in the following questions ( 1 to 5) :

Q1. y3 - 3xy2 = x3 + 3x2y

Q2. (x + y)2 = 2axy

Q3. ax2 + 2hxy + by2 + 2gx + 2fy + c = 0

Q4. 3x - 2y = log(3x + 2y)

Q5. ex - y = log ( x / y )

Q6. If xy = 1, prove that 3 dy / dx + y4 = 0

Q7. If √(y + x) + √(y - x) = c show that dy / dx = y / x - √( y2 / x2 - 1 )

Q8. Use implicit differentiation to verify that dy / dx . dx / dy = 1 when (i) y2 = 4ax (ii) x3 + y3 = 3axy.

Q9. If y = √x + √ x + √ x +....∞ prove that (2y - 1) dy / dx = 1

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Find
dy / dx
in the following questions ( 1 to 5) :

Q1. y³ - 3xy² = x³ + 3x²y

Q2. (x + y)² = 2axy

Q3. ax² + 2hxy + by² + 2gx + 2fy + c = 0

Q5. e^{x - y} = log (
x / y
)

Q6. If xy = 1, prove that 3
dy / dx
+ y⁴ = 0

Q7. If √(y + x) + √(y - x) = c show that
dy / dx
=
y / x
- √(
y² / x²
- 1 )

Q8. Use implicit differentiation to verify that
dy / dx
.
dx / dy
= 1 when
(i) y² = 4ax
(ii) x³ + y³ = 3axy.

Q9. If y = √x + √ x + √ x +....∞ prove that (2y - 1)
dy / dx
= 1