Calculus 50-Term Crossword

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4. Points of __________ occur when the function changes concavity.
6. The _____________ rate of change is the slope of a function at a certain time.
8. The _____ rule differentiates f(x) = x^n to n * x^(n-1)
11. The antiderivative of velocity.
12. Functions that have no discontinuities.
16. We must find the ______ of a solid if a curve is revolved around the x-axis or y-axis.
19. The _______ rate of change is the slope of a function over the entire interval.
21. A method of integration where you swap certain variables with U and its derivative, dU.
22. The rate of change of a function with respect to a variable.
23. Type of function that undoes the action of another function.
24. A function is __________ if the slope of the function is negative.
28. The derivative of position.
31. The ______ maximum/minimum is the largest/smallest overall value in a set.
33. A function is __________ if the slope of the function is positive.
34. Type of discontinuity where the left limit doesn’t equal the right limit.
36. A ________ integral is the area under a curve between 2 fixed limits.
37. A _______ sum helps approximate a region’s area.
40. The limit as x approaches 0 in the function Sin(x)/x = ?
42. Relates to the rate of change of a function's derivative. Can be “up” or “down.”
43. The integral of a function can be seen as the ____ under the curve of the graph of the function.
44. a line that approaches a function but doesn’t meet it.
45. Derivative exists at each point in its domain; implies continuity.
46. When X approaches a value.
47. Type of line that touches a curve at one point.
48. The ______ method helps us calculate the volume between 2 functions rotated around the x-axis.

Down

1. The process of finding maximum and minimum values given constraints using calculus.
2. The steepness of a line, found by dividing the change in y over the change in x.
3. An __________ integral is the area under a curve with no defined limits.
5. Type of differentiation used when solving for Y is nearly impossible.
7. The absolute value of velocity.
9. This abbreviated principle gives us a way to evaluate definite integrals and establishes the relationship between differentiation and integration.
10. The ________ rule differentiates f(x)/g(x) to (f’(x)*g(x) - f(x)*g’(x))/g(x)^2
13. An _______ asymptote occurs when the numerator’s degree is exactly one greater than the numerator’s.
14. Type of line that touches a curve at two points.
15. To undo the function “ln(x),” we must use ______________ to raise “e” to the power of ln(x), which equals x.
17. A ________ asymptote occurs when the limit of the function does not exist and the function is undefined.
18. Type of discontinuity where a limit doesn’t equal the exact value.
20. Any point at which the value of a function is a maximum or a minimum.
21. The ______ theorem is a limit method where we pinch a function between two easier ones to evaluate an indeterminate limit.
24. A point in a function where it is not continuous.
25. The _____ rule differentiates f(g(x)) to f’(g(x)) * g’(x)
26. This abbreviated principle states that a continuous function in the interval [a, b], will take on any given value between f(a) and f(b)
27. _________’s rule can be used when a limit is indeterminate.
29. A __________ asymptote occurs when the numerator’s degree is less than the denominator’s.
30. An abrupt change in the slope of a function.
32. The derivative of velocity.
35. The _______ rule differentiates f(x)*g(x) to f’(x)*g(x) + f(x)*g’(x)
38. An “antiderivative;” a mathematical object that can be interpreted as a generalization of area.
39. This abbreviated principle states that a continuous function f(x) in the interval [a,b] that is differentiable on the interval (a,b), has a point c in the interval (a,b) that exists such that f'(c) is equal to the function's average rate of change over [a,b].
41. A ________ maximum/minimum is the largest/smallest value in an interval of a set.