Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25

Calculus One – Implicit Differentiation – Section 2.5

To determine derivatives implicitly, differentiate term by term, using y′ (similar to u′ in the

chain rule) for any term containing a y-variable. Then solve for y′ .

Together from power-point You try.

1. 3y2

+ 2x3 – 14 = 0 2. y

3 + y

2 – 5y – x

2 = -4

3. 2y3 + y

2 – x = 0 4. 3x

2 + y -2 = 0

5. 3x4 + y – 2 = 0 6. x

2 + y

2 = 4

7. 2x3y – x

3 + 5 = 0 8. 3xy

2 – 8.23 = 0

Find the slope of the tangent line (AKA evaluate the derivative) at the indicated point. (2,1)

9. 3xy – 2x – 2 = 0 10. 2y + xy – 10 = 0

At (2,1) At (3,2)

Use implicit differentiation with trig functions.

11. tan x = y – x 12. cox x + y = sin y

13. x = cos (xy) 14. sin (xy) + 2cos3x = 12

Homework: Page 146, problems 1-11 odd, 15, 21, 25