calc 2640 Word Scramble
|
Embed Code - If you would like this activity on your web page, copy the script below and paste it into your web page.
Normal Size Small Size show me how
Normal Size Small Size show me how
Question | Answer |
X-intercept? | y=0 |
Y-intercept? | x=0 |
Vertical Asymptote? | the limit as X approaches X sub zero of the function = + or - infinity |
Horizontal Asymptote? | the limit as X approaches + or - infinity of the function = L, graph levels off at y=L at ends. |
Oblique Asymptote? | is degree of numerator exceeds the degree of the denominator by one. divide numerator by the denominator. |
Cusp? | If: 1) f(x) is continuous at Xsubzero 2) f(x) has a vertical tangent at x=xsubzero 3) fprime(x)goes to infinity on one side and -infinity on the other. |
Newton's Method | Xn+1 = Xn - (f(Xn)/fprime(Xn)) |
For area, find delta x... | delta x = b-a/n |
inscribed means... | Under the curve, underestimation |
Circumscribed means... | over the curve, overestimation |
Redefine an index for a summation. | (top-bottom)+1 |
summation of K from K=1 to n | n(n+1)/2 |
summation of K^2 from K=1 to n | n(n+1)(2n+1)/6 |
summation of K^3 from K=1 to n | (n(n+1)/2)^2 |
steps to interpret an antiderivative as area | 1) delta x 2) points of subdivision 3) area of Kth rectangle(Ak = f(Ck)(delta x) 4)approimate total area(summation from K=1 to n) 5)Actual area (limit of approx. area) |
Riemann sum | Approx. Area = summation of f(Xk*)(delta Xk)from K=1 to n |
Created by:
burtond
Popular Math sets