Calculus BC
Cards (545)
- Definition of limit: The limit as x approaches c of f of x exists if each of the one-sided limits respectively exist and are the same
- Reasons for limit non-existence:
- One-sided limits disagree, leading to a jump discontinuity
- Unbounded behavior, such as a vertical asymptote
- Oscillation, where the function wiggles back and forth and does not approach a singular value
- Linearity of limits:
- The limit of the sum is the sum of the limits
- Multiplying by a constant works as expected
- To simplify rational expressions to lowest terms, factor the numerator and denominator, then cancel common factors
- When multiplying fractions with just numbers, multiply the numerators and denominators together
- When dividing fractions, multiply by the reciprocal of the fraction in the denominator
- To add or subtract rational expressions, find a common denominator by factoring the denominators and then rewrite each fraction in terms of the least common denominator
- The average rate of change for a function on the interval from a to b is the slope of the secant line between the two points A, F of A and B, F of B, given by the formula: (f(b) - f(a)) / (b - a)
- The difference quotient represents the average rate of change of a function on the interval from x to x + h, and is calculated as (f(x + h) - f(x)) / h
- To calculate the difference quotient, substitute x + h into the function to find f(x + h), subtract f(x), simplify the numerator, and then divide by h
- In the context of limits, as x approaches a certain value, f(x) approaches a specific value
- For piecewise defined functions, consider different cases for the function's behavior based on the input values
- When x is near a specific value but not equal to it, the limit of f(x) as x approaches that value can be determined
- In the language of limits, the limit as x approaches one of F of x is equal to L
- The value of F at one is actually equal to zero, not L
- The limit as x goes to a of f of x equals L means that f of x gets arbitrarily close to L as x gets arbitrarily close to a
- For any function f of x and for real numbers a and L, the limit as x goes to a of f of x equals L means that f of x gets arbitrarily close to L as x gets arbitrarily close to a
- The limit of f of x as x goes to one is two, even though f of one itself does not exist
- The limit as x goes to two of g of x does not exist
- The limit as x goes to negative two from the right of h of x is infinity
- The limit as x goes to negative two from the left of h of x is negative infinity
- The limit as x goes to negative two of h of x does not exist
- The limit as x goes to zero of sine pi over x does not exist
- The limit as x goes to zero of x squared sine one over x does not exist
- The limit laws apply if the limits of the component functions exist as finite numbers
- The limit of the sum f of x plus g of x is equal to the limit of f of x plus the limit of g of x
- The limit of the difference f of x minus g of x is equal to the limit of f of x minus the limit of g of x
- The limit of C times f of x is C times the limit of f of x
- The limit of the product f of x times g of x is the product of the limits
- The limit of the quotient f of x divided by g of x is the quotient of the limits, provided that the limit of g of x is not equal to zero
- The limit as x goes to two of x squared plus 3x plus six divided by x plus nine is 16/11
- The squeeze theorem states that if f of x is less than or equal to g of x, which is less than or equal to h of x, and the limits of f of x and h of x as x approaches a are equal, then the limit of g of x as x approaches a is also equal to that limit
- Product rule only applies when the component limits both exist
- Product rule does not provide information if the second limit doesn't exist
- Squeeze theorem can be used when a function is trapped between two other functions with the same limit
- Example of using algebra to find bounding functions for a function trapped between x squared and -x squared
- Glacial erosion is the breaking down and removal of rocks and sediment by natural forces
- In glacial environments, the 2 main forms of erosion are abrasion and plucking
- Abrasion:
- A sandpapering effect caused by small rocks embedded within the glacier rubbing on bedrock
- Usually leaves a smooth surface with scratches called striations
- Plucking:
- Meltwater from glaciers freeze around broken or cracked parts of rock, breaking it off from the bedrock or sides as the ice moves down the slope
- Most prominent when there are many joints in the rock, as water can penetrate the rock and freeze in the cracks