25) Let h(t)=tan(4t+7). Then h'(3) is    and h''(3) is

A line passing through (1,2,3) and perpendicular to both r(t)= <3-2t, 5+8t, 7-4t> and R(t) =...

A line passing through (1,2,3) and perpendicular to both r(t)= <3-2t, 5+8t, 7-4t> and R(t) = <-2t, 5+t, 7-t> and also passes through (-3,8,17) True or false  

Differential Equations (a) Write the function x(t)=−2cos(4t)+5sin(4t)x(t)=−2cos(4t)+5sin(4t) in the form x(t)=Acos(ωt−ϕ)x(t)=Acos⁡(ωt−ϕ). x(t)=   (b) Write the function...

Differential Equations (a) Write the function x(t)=−2cos(4t)+5sin(4t)x(t)=−2cos(4t)+5sin(4t) in the form x(t)=Acos(ωt−ϕ)x(t)=Acos⁡(ωt−ϕ). x(t)=   (b) Write the function x(t)=2cos(4t)+5sin(4t)x(t)=2cos(4t)+5sin(4t) in the form x(t)=Acos(ωt−ϕ)x(t)=Acos⁡(ωt−ϕ). x(t)=   (c) Write x(t)=e−3t(−2cos(4t)+5sin(4t))x(t)=e−3t(−2cos(4t)+5sin(4t)) in the form y(t)=Aeαtcos(ωt−ϕ)y(t)=Aeαtcos⁡(ωt−ϕ). x(t)=

Evaluate s(t)=∫t−∞||r′(u)||dus(t)=∫−∞t||r′(u)||du for the Bernoulli spiral r(t)=〈etcos(4t),etsin(4t)〉r(t)=〈etcos⁡(4t),etsin⁡(4t)〉. It is convenient to take −∞−∞ as the lower...

Evaluate s(t)=∫t−∞||r′(u)||dus(t)=∫−∞t||r′(u)||du for the Bernoulli spiral r(t)=〈etcos(4t),etsin(4t)〉r(t)=〈etcos⁡(4t),etsin⁡(4t)〉. It is convenient to take −∞−∞ as the lower limit since s(−∞)=0s(−∞)=0. Then use ss to obtain an arc length parametrization of r(t)r(t). r1(s)=〈r1(s)=〈  , 〉

Let f(t) be the solution of y' = y(4t-1), y(0) = 4. Use Euler's method with...

Let f(t) be the solution of y' = y(4t-1), y(0) = 4. Use Euler's method with n = 3 to estimate f(1). (Round your answer to three decimal places.)

find the exact value of tan[arctan(1/2)+arccos(7/25)]

find the exact value of tan[arctan(1/2)+arccos(7/25)]

Determine whether the lines L1:x=7+3t, y=7+3t, z=−1+t and L2:x=−10+4t, y=−12+5t, z=−12+4t intersect, are skew, or are...

Determine whether the lines L1:x=7+3t, y=7+3t, z=−1+t and L2:x=−10+4t, y=−12+5t, z=−12+4t intersect, are skew, or are parallel. If they intersect, determine the point of intersection; if not leave the remaining answer blanks empty.

(1 point) Find the minimum speed of a particle with trajectory c(t)=(t^3−4t,t^2+1)

(1 point) Find the minimum speed of a particle with trajectory c(t)=(t^3−4t,t^2+1)

Assume f(t) = (g ∗ h)(t). Let the delayed versions of g(t) and h(t) be g1(t)...

Assume f(t) = (g ∗ h)(t). Let the delayed versions of g(t) and h(t) be g1(t) = g(t − 1) h1(t) = h(t − 1) Find a simple expression for (g1 ∗ h1)(t) in terms of f(t).

graph f(t)=t^6-4t^4-2t^3+3t^2+2t on the interval [-3/2,5,2] using matlab

graph f(t)=t^6-4t^4-2t^3+3t^2+2t on the interval [-3/2,5,2] using matlab

Mice come in 2 colors black(t) and tan (T). Tan is dominant. 1. Create a punnet...

Mice come in 2 colors black(t) and tan (T). Tan is dominant. 1. Create a punnet square between 2 heterozygotic tan mice. 2.Out of these offspring what percent would be homozygous recessive? Their phenotype would be? 3. If 1 of the mice parent was TT could that result in a recessive? Explain.