Use Euler's method to calculate the first three approximations to the given initial value problem for the specified increment size. Round your results to four decimal places.y' = 4xex4, y(1) = 2, dx = 0.1

Write the fraction as a decimal.- 

A. -0.535 B. -0.525 C. -0.485 D. -0.425

Convert the equation to the standard form for a hyperbola by completing the square on x and y.x2 - y2 - 4x + 4y - 1 = 0

A. (x - 2) ² - (y - 2) ² = 1
B.  -  = 1
C. (x - 2) ² + (y - 2) ² = 1
D. (y - 2) ² - (x - 2) ² = 1

Find the area of the shaded region. Use 3.14 to approximate ?, if needed. Round to the nearest tenth if necessary.

A. 20 sq yd B. 36 sq yd C. 10 sq yd D. 40 sq yd

Find the x- and y-intercepts of f.f(x) = (x + 2)2

A. x-intercept: -2; y-intercept: 0 B. x-intercept: 2; y-intercept: 0 C. x-intercept: 2; y-intercept: 4 D. x-intercept: -2; y-intercept: 4