P(W < t) = 1/12(t^2+ 2t^3) for 0 ≤ t ≤ 2. Write an integral for...

Consider W = Span{p1(t),p2(t)} where p1(t) = 1−t^2 and p2(t) = 3+2t are the polynomials defined...

Consider W = Span{p1(t),p2(t)} where p1(t) = 1−t^2 and p2(t) = 3+2t are the polynomials defined on the interval [−1,1]. Find the orthogonal projection of q(t) = t^2−t−1 onto W.

For problem 1 to 3, use r(t)= <e^2t cost, e^2t sint, e^2t> to find each of...

For problem 1 to 3, use r(t)= <e^2t cost, e^2t sint, e^2t> to find each of the following at t = 0. 1, T(t) 2, N(t) 3, Curvature

Evaluate the following integral: 1. ∫xsec(square)xdx 2. ∫e(power)t{root(1+e(power)2t)}dt

Evaluate the following integral: 1. ∫xsec(square)xdx 2. ∫e(power)t{root(1+e(power)2t)}dt

x y s t P 1 -3 1 0 0 12 1 2 0 1 0...

x y s t P 1 -3 1 0 0 12 1 2 0 1 0 3 -6 -4 0 0 1 0 The pivot element for the initial simplex tableau show is the red 1. So we need to zero out the other elements of column x. What is the formula used to zero out row 1 and column x? Multiply Row _____by_______ and then add the result to Row_____ What is the formula used to zero out row...

Let c be the path given by c(t) = (2t, t^2, ln(t)) for t > 0....

Let c be the path given by c(t) = (2t, t^2, ln(t)) for t > 0. Set up the integral that yields the arclength of c between the points (2, 1, 0) and (4, 4, log2). I know how to set up the inner part of the integral but I dont know how to find the bounds for the integral. If you want to skip the part where you set up the integral and just show me how to find...

Solve the initial value problem t^(13) (dy/dt) +2t^(12) y =t^25 with t>0 and y(1)=0 (y'-e^-t+4)/y=-4, y(0)=-1

Solve the initial value problem t^(13) (dy/dt) +2t^(12) y =t^25 with t>0 and y(1)=0 (y'-e^-t+4)/y=-4, y(0)=-1

A space curve C is parametrically parametrically defined by x(t)=e^t^(2) −10, y(t)=2t^(3/2) +10, z(t)=−π, t∈[0,+∞). (a)...

A space curve C is parametrically parametrically defined by x(t)=e^t^(2) −10, y(t)=2t^(3/2) +10, z(t)=−π, t∈[0,+∞). (a) What is the vector representation r⃗(t) for C ? (b) Is C a smooth curve? Justify your answer. (c) Find a unit tangent vector to C . (d) Let the vector-valued function v⃗ be defined by v⃗(t)=dr⃗(t)/dt Evaluate the following indefinite integral ∫(v⃗(t)×i^)dt. (cross product)

Find the length of the curve x = 3t^(2), y = 2t^(3) , 0 ≤ t...

Find the length of the curve x = 3t^(2), y = 2t^(3) , 0 ≤ t ≤ 1

Use the Laplace transform to solve the given integral equation. f(t) = 2t − 4 t...

Use the Laplace transform to solve the given integral equation. f(t) = 2t − 4 t 0 sin(τ) f(t − τ) dτ

2. (12 pts.)If r"(t) = 〈1, t, sin(t)〉 , r'(0) = 〈2, 3, 1〉 and r(0)...

2. (12 pts.)If r"(t) = 〈1, t, sin(t)〉 , r'(0) = 〈2, 3, 1〉 and r(0) = 〈1, 0, 1〉, find r(t).