Categories: All - area - function - derivative - velocity

by Michelle Breeden 11 months ago

59

Chapters 3 and 5

The provided content delves into fundamental calculus concepts, focusing on the definite integral and its various properties. It explains the integral as the net area under a curve, distinguishing between positive and negative areas depending on their position relative to the axis.

Chapters 3 and 5

Chapters 3 and 5

Indeinfite Integral

Values of x^

Midpoint of each subinterval
Right endpoint of each subinterval
Left end point of each subinterval

Related Rated

Rate
A special ratio in which the two terms are in different untis
Terms of the Ratio
The numbers or measurements being compared

Derivatives of Logs

Recall = x
y = ln x if and only if x = e^y

The domain of ln x (0,infinity)

Chain Rule

the derivative of the inside times the derivative of the outside
Substitute u for g (x)

Derivative of x^kx

The Product and Quotient Rules

If f and g are differentiable at x, then d / dx fg = f'g = g'f
The derivative of the First times the Second plus the derivative of the Second times the First

Recall the function f (x) = e^x where e is the exponential number

e = 2.7182818288

Position Function over Time

Given a position function s (t), the change in position becomes d = rt

Definite Intergral

The Area function/intergral
above represent the Net area

equals TOTAL net area of a function

area below the axis is negation

area aboive the axis is positive

Variable of integration
dx
integrand
function under the integral
Limits of integration / limits of summation
Derivative is the velocity / slope rate of change.

Definition of Area Under a Curve

If the function f is continuous on [a,b] and if f (x) > 0for all x in [a,b], then the area under the curve

Inverse Trig Functions

SOHCAHTOA
Pythagorean Identities

Implicit Differentiation

dy / dx notation
The derivative of y with respects to x
Implicit functions
Equations that are not written in terms of one variable

Some implicit equations cannot be written explicitly

Explicit funtions
Where one variable is defined explicitly in terms of another variable

Derivatives of Trig Functions

Trigonometric Limits: Recall

Quotient Rule

If f and g are differentiable at x and g (x) are not equal to 0, then d / dx f / g = f'g - g'f / g^2
The derivative of the Top times the Bottom minus the derivative of the Bottom times the Top all over the Bottom squared.

Higher Order Derivatives

Assuming y = f (x) can be differentiated as often as necessary, the second derivative of f is f'' (x)

The average velocity is v (t) = change in distance / change in time

This is just the average / slope
s' (t) = v (t)

Derivative of Polynomials and Exponential Function

Sum/Differnece Rule
If f and g are differenetiable at x, then d/dx (f + g)
Constant Multiple Rule
If f is differentiable at x and c is a constant number then d / dx (cf (x)
Power Rule
If n is a any real number, then f (x) = x^n
Constant Rules
If c is a constant number, then f (x) = c