Categorieën: Alle - derivatives - asymptotes - laws - slope

door christopher chacon 3 jaren geleden

163

Limits and Derivatives

Calculus involves the study of limits and derivatives, fundamental concepts that help describe how functions behave. Limits are used to determine the behavior of a function as it approaches a particular point or infinity, with various laws such as the Product, Quotient, Sum, Constant Multiple, and Difference laws governing their calculations.

Limits and Derivatives

Limits and Derivatives

Limit Laws

Quotient Law
Limit of a quotient is the quotient of the limits(if the limit of the denominator is not 0)
Product Law
Limit of a product is the product of the limits
Constant Multiple Law
Limit of a constant times a function is the constant times the limit of the function
Difference Law
Limit of the difference is the difference of the limits
Sum Law
Limit of the sum is the sum of the limits

Derivatives

Horizontal Tangents then f'(x)=0
f'(x)=(x, f(x)) + estimate slope; f'(x)=(x, f'(x))
Slope change in y over change in x
The function of f' is derived from function of f

Limits at Infinity

The limits at infinity can go in 2 directions depending on the direction the x is traveling on infinity
Negative means x is coming from the left Positive means x is coming from the right
x to infinity grows larger or smaller it approaches a horizontal or vertical asymptote
As x approaches infinity and f(x) equals a number than the function has a horizontal asymptote
As x approaches a number and f(x) is equal to infinity than the function has a vertical asymptote

Tangents

Secant line hits two points on a curve
Point-Slope Formula y-y1=m(x-x1)
Slope of Tangent Line can touch one point on line of a curve
2 points to estimate a slope