Section 1

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Geometric Recursive Formula

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Last updated

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Date created

Mar 1, 2020

Cards (25)

Section 1

(25 cards)

Geometric Recursive Formula

Front

Back

Slope Intercept Form

Front

y=mx+b

Back

tangent

Front

Oposite/Adjacent

Back

1st Step in Completing the Square

Front

Subtract c from each side

Back

Circumference of a Circle

Front

C=2πr

Back

3rd Step in Completing the Square

Front

Add (b/2)^2 to each side

Back

sine

Front

Oposite/Hypotonuse

Back

Quadratic Formula

Front

x=(-b±√b^2-4ac)/2a

Back

5th Step in Completing the Square

Front

Find the square root of each side of the equation

Back

cosine

Front

Adjacent/Hypotonuse

Back

Simple Interest

Front

I=PRT

Back

4th Step in Completing the Square

Front

The left side of the equation is now a perfect trinomial write the left side as the square of a binomial

Back

Point-Slope Form

Front

y-y1=m(x-x1)

Back

Compound Interest

Front

A=P(1+r/n)^(nt)

Back

Standard Form

Front

Ax+By=C

Back

Axis of symetry

Front

x=-b/2a

Back

2nd Step in Completing the Square

Front

Divide each side by a

Back

Volume of Cylinder

Front

V= πr^2 h

Back

Formula for Slope

Front

m=(y2-y1)/(x2-x1)

Back

Surface Area of A Cylinder

Front

A= 2πrh+2πr^2

Back

What is the discriminant of a perfect square?

Front

b^2-4ac

Back

Geometric Explicit Formula

Front

Back

Area of Circle

Front

A=πr^2

Back

6th Step in Completing the Square

Front

Solve for x

Back

Exponential Formula

Front

y=ab^x or y=a(1±r)^x

Back