Let T = T1 ° T2. Find the standard matrix for T and find T(v1). What...

Find the standard matrix A associated to each of these linear transformations T: R2 --> R2...

Find the standard matrix A associated to each of these linear transformations T: R2 --> R2 a) T1(x,y) = (-x,y) b) T2(x,y) = (x,-y) c) T3(x,y) = (y,x) d) T4(x,y) = (kx,y) e) T5(x,y) = (x,ky) f) T6(x,y) = (x+ky,y) g) T7(x,y) = (x,kx+y) h) T8 (x,y) = (cos(theta)x - sin(theta)y, sin(theta)x + cos(theta)y)

Find the derivative r '(t) of the vector function r(t). <t cos 3t , t2, t...

Find the derivative r '(t) of the vector function r(t). <t cos 3t , t2, t sin 3t>

Question 4.Let C be the curve in three dimensions with the following parameterization for 0≤t≤2: (sin(πt71),t2−3t+...

Question 4.Let C be the curve in three dimensions with the following parameterization for 0≤t≤2: (sin(πt71),t2−3t+ 2,t3−3t). Find the value of ∫C (cos(x+y) +ze^xz)dx+ cos(x+y)dy+ (xe^xz+ 2)dz.

Using Exponentials and Logarithms, show that T2/T1 =(V1/V2)k-1 where p is pressure T is temperature and...

Using Exponentials and Logarithms, show that T2/T1 =(V1/V2)k-1 where p is pressure T is temperature and V is volume k is is a constant.

Let T1 and T2 be independent exponential random variables with a common mean 2. Find the...

Let T1 and T2 be independent exponential random variables with a common mean 2. Find the MGF and then identify the distribution of T1 + T2

* Consider the transformations T1=‘reflection across the x-axis’ and T2=‘reflection across the line y = x’....

* Consider the transformations T1=‘reflection across the x-axis’ and T2=‘reflection across the line y = x’. (a) Find the matrices A1 and A2 corresponding to T1 and T2, respectively. (b) Show that (A1) 2 = I, and give a geometrical interpretation of this. (c) Use matrix multiplication to find the geometric effect of T1 followed by T2, showing all your reasoning. (d) The product T (θ)T (φ) of any two reflections T (θ) and T (φ) with angles θ and...

Solve the heat equation and find the steady state solution : uxx=ut 0<x<1, t>0, u(0,t)=T1, u(1,t)=T2,...

Solve the heat equation and find the steady state solution : uxx=ut 0<x<1, t>0, u(0,t)=T1, u(1,t)=T2, where T1 and T2 are distinct constants, and u(x,0)=0

The nonhomogeneous equation t2 y′′−2 y=19 t2−1, t>0, has homogeneous solutions y1(t)=t2, y2(t)=t−1. Find the particular...

The nonhomogeneous equation t2 y′′−2 y=19 t2−1, t>0, has homogeneous solutions y1(t)=t2, y2(t)=t−1. Find the particular solution to the nonhomogeneous equation that does not involve any terms from the homogeneous solution. Enter an exact answer. Enclose arguments of functions in parentheses. For example, sin(2x). y(t)=

1.Let y=6x^2. Find a parametrization of the osculating circle at the point x=4. 2. Find the...

1.Let y=6x^2. Find a parametrization of the osculating circle at the point x=4. 2. Find the vector OQ−→− to the center of the osculating circle, and its radius R at the point indicated. r⃗ (t)=<2t−sin(t), 1−cos(t)>,t=π 3. Find the unit normal vector N⃗ (t) of r⃗ (t)=<10t^2, 2t^3> at t=1. 4. Find the normal vector to r⃗ (t)=<3⋅t,3⋅cos(t)> at t=π4. 5. Evaluate the curvature of r⃗ (t)=<3−12t, e^(2t−24), 24t−t2> at the point t=12. 6. Calculate the curvature function for r⃗...

Let A equal the 2x2 matrix: [1 -2] [2 -1] and let T=LA R2->R2. (Notice that...

Let A equal the 2x2 matrix: [1 -2] [2 -1] and let T=LA R2->R2. (Notice that this means T(x,y)=(x-2y,2x-y), and that the matrix representation of T with respect to the standard basis is A.) a. Find the matrix representation [T]BB where B={(1,1),(-1,1)} b. Find an invertible 2x2 matrix Q so that [T]B = Q-1AQ