1. Given that the point P = (− , trigonometric functions?
1. Given that the point P = (− , trigonometric functions?
1. Find the tangent plane to the function: f(x, y) = sin(xy) at x = ,y = π
1. Find the linearization of f(x) = √ 27 + x at x = 0. Use this to
1. Find all six trigonometric functions of θ if (3, 7) is on the terminal
1. Evaluate ∫ 3 xex2 dx. Call the integral I, and let t = x 2. Then dt
1. Evaluate the given integral (a) ∫ 3xe−x2 dx (b) ∫ 3√x ln x dx (c
1. Evaluate each of the following EXACTLY
1. Basic Derivative formulae (xn) = nx (ax) = a x ln a (ex) = e (loga x
1. Applications of trigonometry to triangles
1. a) Draw triangle ABC with vertices A(1,1), B(2,3) and C(3,1
1. A right triangle has legs of 8 centimeters and... centimeters. Solve the triangle completely.
1. 2sinxcosx − 3sin x = 0 sin2 x +cos2 x csc x
1. /8 Answer the following short questions. Each question is
1. (a) (2 points) Draw a picture of a function that exactly two local
