Given w=(9r2+4s2+3t2)1/2 Find ∂w/∂r, ∂w/∂s, and ∂w/∂t.

1. (1’) The position function of a particle is given by s(t) = 3t2 − t3,...

1. (1’) The position function of a particle is given by s(t) = 3t2 − t3, t ≥ 0. (a) When does the particle reach a velocity of 0 m/s? Explain the significance of this value of t. (b) When does the particle have acceleration 0 m/s2? 2. (1’) Evaluate the limit, if it exists. lim |x|/x→0 x 3. (1’) Use implicit differentiation to find an equation of the tangent line to the curve sin(x) + cos(y) = 1 at...

The velocity function of a particle is given by v(t) = 3t2 – 24t + 36....

The velocity function of a particle is given by v(t) = 3t2 – 24t + 36. a) Find the equation for a(t), the acceleration. b) If s(1) = 50, find the displacement function s(t). c) When will the velocity be zero? d) Find the distance the particle travels on [0, 4].

Find the derivative of the function. h(t) = (t + 4)2/3(3t2 − 2)3

Find the derivative of the function. h(t) = (t + 4)2/3(3t2 − 2)3

The T: R 4 → R 4 , given by T (x, y, z, w) =...

The T: R 4 → R 4 , given by T (x, y, z, w) = (x + y, y, z, 2z + 1) is a linear transformation? Justify that.

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉...

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉 Find the second derivative r″(t)=〈r″(t)=〈 Find the curvature at t=1t=1 κ(1)=κ(1)= 2. (1 point) Find the distance from the point (-1, -5, 3) to the plane −4x+4y+0z=−3.

given a(t) = 30t - 14, v(1) = 2 and s(1) = 3, find v(t) and...

given a(t) = 30t - 14, v(1) = 2 and s(1) = 3, find v(t) and s(t).

Write the curve given by r(t)=((3/2)t)i+(t^3/2)j as a function r(s) parameterized by the arc length s...

Write the curve given by r(t)=((3/2)t)i+(t^3/2)j as a function r(s) parameterized by the arc length s from the point where t=0. Write your answer using standard unit vector notation.

Find the curvatures of the given curves. i: r(t) = ⟨t, t2/2, t2⟩ ii: r(t) =...

Find the curvatures of the given curves. i: r(t) = ⟨t, t2/2, t2⟩ ii: r(t) = ti + t2j + etk

Let W be an inner product space and v1,...,vn a basis of V. Show that〈S, T...

Let W be an inner product space and v1,...,vn a basis of V. Show that〈S, T 〉 = 〈Sv1, T v1〉 + . . . + 〈Svn, T vn〉 for S,T ∈ L(V,W) is an inner product on L(V,W). Let S ∈ L(R^2) be given by S(x1, x2) = (x1 + x2, x2) and let I ∈ L(R^2) be the identity operator. Using the inner product defined in problem 1 for the standard basis and the dot product, compute 〈S,...

use the Chain Rule to find ∂w/∂s for w=e^xcos(y) where x=s^2sin(t) and y=s/t

use the Chain Rule to find ∂w/∂s for w=e^xcos(y) where x=s^2sin(t) and y=s/t