1. Trigonometric Identities The Pythagorean Theorem, sin2 x + cos2
1. Trigonometric Derivatives In this lecture we
1. The Six Trigonometric Functions 1.1 Angles, Degrees
1. The Pythagorean Theorem The Pythagorean theorem states that
1. Test question here
1. RECIPROCAL IDENTITIES secx = 1 cosx cscx = 1 sinx cotx = 1
1. List all possible names for the quadrilateral below?
1. How many times will the graph of y = sin4x intersect the x
1. h = r so 2r2 = 100 Þ r2 = 50 (M1) l = 10q = 2pr (M1) Þ q = (A1) = q
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. COMPLEX NUMBERS
1. Basic Derivative formulae (xn) = nx (ax) = a x ln a (ex) = e (loga x
1. Applications of trigonometry to triangles
