h(x)=sin[3x+(x^2 +1)^4] what is h'(0)

(3)If H(x, y) = x^2 y^4 + x^4 y^2 + 3x^2 y^2 + 1, show that...

(3)If H(x, y) = x^2 y^4 + x^4 y^2 + 3x^2 y^2 + 1, show that H(x, y) ≥ 0 for all (x, y). Hint: find the minimum value of H. (4) Let f(x, y) = (y − x^2 ) (y − 2x^2 ). Show that the origin is a critical point for f which is a saddle point, even though on any line through the origin, f has a local minimum at (0, 0)

Find the derivatives of m(x)=2ln((x^(3)e^(x))/(x^(2)-4)^(1/2)) and h(x)=(e^(3x))/(1-e^(-3x))

Find the derivatives of m(x)=2ln((x^(3)e^(x))/(x^(2)-4)^(1/2)) and h(x)=(e^(3x))/(1-e^(-3x))

integral of sin^2(3x)cos^4(3x)

integral of sin^2(3x)cos^4(3x)

Consider the following initial value problem: x′′−3x′−40x=sin(2t),x(0)=4,x′(0)=3 Using X for the Laplace transform of x(t), i.e.,...

Consider the following initial value problem: x′′−3x′−40x=sin(2t),x(0)=4,x′(0)=3 Using X for the Laplace transform of x(t), i.e., X=L{x(t)},, find the equation you get by taking the Laplace transform of the differential equation and solve for X(s)=

Use the eigenfunction expansion to solve utt = uxx + e −t sin(3x), 0 < x...

Use the eigenfunction expansion to solve utt = uxx + e −t sin(3x), 0 < x < π u(x, 0) = sin(x), ut(x, 0) = 0 u(0, t) = 1, u(π, t) = 0. Your solution should be in the form of Fourier series. Write down the formulas that determine the coefficients in the Fourier series but do not evaluate the integrals

1. Find the area bounded by f(x)=3x^2-4 and y=0 for 0 < X < 1. A....

1. Find the area bounded by f(x)=3x^2-4 and y=0 for 0 < X < 1. A. 1 B. 2 C. 6 D. 3 2. The revenue (thousands of dollars) from producing x units of an item is modeled by R(x)= 5x-0.0005x^2. Find the marginal revenue at x=1000. A. $104 B. $4 C. $4.50    D. $10,300 3. Find y' for y=y(x) defined implicitly by 3xy-x^2-4=0 4. Find: lim x->-1 6x+5/5x-6 A. -11    B. 1/11    C. -1/11    D....

[2 marks] Find the derivative of y  =  √ 4 sin x + 6 at x  ...

[2 marks] Find the derivative of y  =  √ 4 sin x + 6 at x  =  0. Consider the following statements. The limit lim x→0 g(4 + h) − g(4) h is equivalent to: (i) The derivative of g(x) at x  =  h (ii) The derivative of g(x + 4) at x  =  0 (iii) The derivative of g(−x) at x  =  −4 Determine which of the above statements are True (1) or False (2). If  f (3)  = ...

Let h be the function defined by H(x)= integral pi/4 to x (sin^2(t))dt. Which of the...

Let h be the function defined by H(x)= integral pi/4 to x (sin^2(t))dt. Which of the following is an equation for the line tangent to the graph of h at the point where x= pi/4. The function is given by H(x)= integral 1.1 to x (2+ 2ln( ln(t) ) - ( ln(t) )^2)dt for (1.1 < or = x < or = 7). On what intervals, if any, is h increasing? What is a left Riemann sum approximation of integral...

Solve the following a) 2 cos^2(4x) + 5 cos(4x) + 2 = 0. b) arctan(3x +...

Solve the following a) 2 cos^2(4x) + 5 cos(4x) + 2 = 0. b) arctan(3x + 3) = π/4 c) 2^1+sin^2(x) = 4^sin(x) d) ln(x + 3) = ln(x) + ln(3)

Give the solution to the given boundary value problem y''+y=18x y(0)=0 y(1)+y'(1)=0 answer: 3x- (6sin(sqrt6) x)/(sin(sqrt...

Give the solution to the given boundary value problem y''+y=18x y(0)=0 y(1)+y'(1)=0 answer: 3x- (6sin(sqrt6) x)/(sin(sqrt of 6)x +(sqrt 6) cos(sqrt6)