2. Let g(t)=e-21[sin(6m)+2cos(3m). Find | δ(1-2)g(t)dt.
dy Find the solution of dt = 8y (7 – y), y(0) = 21. (Express numbers in exact form. Use symbolic notation and fractions where needed.) y =
1. Find the general solution to dr dt = x + 3y dy dt = 4.0 + 2y
1. Given A = arcsin and cos B= 1 31 3' 2 <B<21 Find the exact value of sin(A+B).
Find dy at x = dt - 5 if y = – 3x2 – 1 and dx = - 5. dt dy dt
(1 point) Similar to 5.2.16 in Rogawski/Adams. Find a, b, and c such that g(t) dt and | gt) dt are as large as possible. ae (1 point) Similar to 5.2.16 in Rogawski/Adams. Find a, b, and c such that g(t) dt and | gt) dt are as large as possible. ae
1) Find dx a s2* arctant dt
(Calculus 1) tan(3x) 1 - 8-21 e-2 Find the derivative of the integral function H (x) = 4+e-21 dt sin(3x)
?3: (a). Find the Z-Transform of h(t)-1 (?[n] + fin-1] + ?[n-21 + fin-31) (b). Find the unit impulse response corresponding to the following system (c)Plot the region of convergence and the Z transform for ln"un], where uin- 0 elscwhere and a is
Consider the state equation 3. Consider the state equation dt -2 -31 x2(t) dt Determine the state-transition matrix ф(t) and the state vector x(t) for t 2 0 when the input is u(t) 1 for t 20. 3. Consider the state equation dt -2 -31 x2(t) dt Determine the state-transition matrix ф(t) and the state vector x(t) for t 2 0 when the input is u(t) 1 for t 20.