2. Use the product rule for differentiation to find derivatives in each of the following: (a)...

1. Use the product rule for differentiation to find derivatives in each of the following: (a)...

1. Use the product rule for differentiation to find derivatives in each of the following: (a) ?(?)=(2?3+4?2−1)(3?2−5?−2) (b) ?(?)=(2?4+1)(3√?−2) (c) ?(?)=(3?−1)(6/?+4?−1)

1). Use the techniques of differentiation to find the derivatives of the following functions a). f(x)=...

1). Use the techniques of differentiation to find the derivatives of the following functions a). f(x)= (2 sqrt x + 1) (2-x/x^2+3x) b). f(x)= cos^2 (3 sqrt x) c). f(x) = Sin x/(x^2 + sin x)

Use the Chain Rule to find the indicated partial derivatives. ? = ?^ 2 + ?^...

Use the Chain Rule to find the indicated partial derivatives. ? = ?^ 2 + ?^ 2 , ? = ?? cos ? , ? = ?? sin ? ??/??, ??/?? , ??/?? ?ℎ?? ? = 2, ? = 3, ? = 0°

Calculate derivatives for the following, Use proper notation. a) y=3x^5+4x+6 b) ?(?)=3√? + 5 ?3 c)...

Calculate derivatives for the following, Use proper notation. a) y=3x^5+4x+6 b) ?(?)=3√? + 5 ?3 c) ? = ?4ln(?) (product rule) d) ?(?) = √4?2 + 1 (chain rule)

Consider the surface x^7z^2+sin(y^7z^2)+10=0 Use implicit differentiation to find the following partial derivatives. ∂z/∂x= ∂z/∂y=

Consider the surface x^7z^2+sin(y^7z^2)+10=0 Use implicit differentiation to find the following partial derivatives. ∂z/∂x= ∂z/∂y=

Use the Chain Rule to find the indicated partial derivatives. u =sqrt( r^2 + s^2) ,...

Use the Chain Rule to find the indicated partial derivatives. u =sqrt( r^2 + s^2) , r = y + x cos(t), s = x + y sin(t) ∂u ∂x , ∂u ∂y , ∂u ∂t when x = 1, y = 4, t = 0

Use the Chain Rule to calculate the partial derivatives ?(?,?)=cos(?2+?2) ?=2?+3?, ?=3?+3? ∂?∂?= ∂?∂?=

Use the Chain Rule to calculate the partial derivatives ?(?,?)=cos(?2+?2) ?=2?+3?, ?=3?+3? ∂?∂?= ∂?∂?=

Use the Chain Rule to find the indicated partial derivatives. w = xy + yz +...

Use the Chain Rule to find the indicated partial derivatives. w = xy + yz + zx,    x = r cos(θ),    y = r sin(θ),    z = rθ; ∂w ∂r , ∂w ∂θ     when r = 4, θ = π 2 ∂w ∂r = ∂w ∂θ =

Use logarithmic differentiation to find the derivative of the function. (a) y = (x + 1)^(2)(x...

Use logarithmic differentiation to find the derivative of the function. (a) y = (x + 1)^(2)(x + 2)^(3) (b) y = (x – 1)^(2)(x + 1)^(3)(x + 3)^(4) (c) y = ex (d) y

Show that the dot product and cross product both satisfy the product rule of differentiation of...

Show that the dot product and cross product both satisfy the product rule of differentiation of vectors.