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

[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)

solve the system of equations 1: y=3x^2-2x-1      2x+3y=2 2: x^2+(y-2)^2=4      x^2-2y=0

solve the system of equations 1: y=3x^2-2x-1      2x+3y=2 2: x^2+(y-2)^2=4      x^2-2y=0