Suppose a(t)= (15/2)square root(t) + 6e^-t, v(0)= -6, and s(0)= 7. Find s(t). Please show work

Find the length of the curve. (square root 2) t i + et j + e−t ...

Find the length of the curve. (square root 2) t i + et j + e−t k   0 ≤ t ≤ 6

please show all work so i can understand Write f(x)=ln((x^2 square root(x-4)/(x+1)^3)) in terms of lnx,...

please show all work so i can understand Write f(x)=ln((x^2 square root(x-4)/(x+1)^3)) in terms of lnx, ln(x+1), and ln(x-4). Then find f '(x).

1. Find y". y = ( √x - 7) -3 2.At time t ≥ 0, the...

1. Find y". y = ( √x - 7) -3 2.At time t ≥ 0, the velocity of a body moving along the s-axis is v= t^2-7t+6 .When is the body moving backward? 3. Use implicit differentiation to find dy/dx x+y/x-y =x^2 +y^2

6) please show steps and explanation. a)Suppose r(t) = < cos(3t), sin(3t),4t >. Find the equation...

6) please show steps and explanation. a)Suppose r(t) = < cos(3t), sin(3t),4t >. Find the equation of the tangent line to r(t) at the point (-1, 0, 4pi). b) Find a vector orthogonal to the plane through the points P (1, 1, 1), Q(2, 0, 3), and R(1, 1, 2) and the area of the triangle PQR.

Discrete Structures question In the style we used to show that the square root of 2...

Discrete Structures question In the style we used to show that the square root of 2 is irrational, show that the square root of six is irrational. You should use the following lemma in your proof: If n2 is a multiple of 6, then so is n (for any integer n).

suppose sigma n=1 to infinity of square root ((a_n)^2 + (b_n)^2)) converges. Show that both sigma...

suppose sigma n=1 to infinity of square root ((a_n)^2 + (b_n)^2)) converges. Show that both sigma a_n and sigma b_n converge absolutely.

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).

Let V be a finite-dimensional vector space over C and T in L(V) be an invertible...

Let V be a finite-dimensional vector space over C and T in L(V) be an invertible operator in V. Suppose also that T=SR is the polar decomposition of T where S is the correspondIng isometry and R=(T*T)^1/2 is the unique positive square root of T*T. Prove that R is an invertible operator that committees with T, that is TR-RT.

Given the set S = {(u,v): 0<= u<=4 and 0<= v<=3} and the transformation T(u, v)...

Given the set S = {(u,v): 0<= u<=4 and 0<= v<=3} and the transformation T(u, v) = (x(u, v), y(u, v)) where x(u, v) = 4u + 5v and y(u, v) = 2u -3v, graph the image R of S under the transformation T in the xy-plan and find the area of region R

use the definition of derivative to find the derivative of f(x)= 2*sqrt(x-7) show work please.

use the definition of derivative to find the derivative of f(x)= 2*sqrt(x-7) show work please.