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16.1: Introduction to Roots and Rational Exponents
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/16%3A_Radical_Expressions_and_Quadratic_Equations/16.01%3A_Introduction_to_Roots_and_Rational_Exponents
10.2.1.3: Factors and Primes
https://math.libretexts.org/Courses/Fullerton_College/Math_100%3A_Liberal_Arts_Math_(Claassen_and_Ikeda)/10%3A_Appendix/10.02%3A_Fractions_and_Mixed_Numbers/10.2.01%3A_Introduction_to_Fractions_and_Mixed_Numbers/10.2.1.03%3A_Factors_and_Primes
That is, the last digit is 0, 2, 4, 6, or 8. (We then say the number is an even number.) For example, in the number 236, the last digit is 6. Although 522 is divisible by 2 (the last digit is even) an...That is, the last digit is 0, 2, 4, 6, or 8. (We then say the number is an even number.) For example, in the number 236, the last digit is 6. Although 522 is divisible by 2 (the last digit is even) and 3 (5+2+2=9, which is a multiple of 3), it is also divisible by 6 and 9. One way to find the prime factorization of a number is to begin with the prime numbers 2, 3, 5, 7, 11 and so on, and determine whether the number is divisible by the primes.
11.1: Integer Exponents
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/11%3A_Exponents_and_Polynomials/11.01%3A_Integer_Exponents
Glossary
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/zz%3A_Back_Matter/20%3A_Glossary
If $A$ is an acute angle of a right triangle, then the cosine of angle $A$ is the ratio of the length of the side adjacent to angle $A$ over the length of the hypotenuse. If $A$ is an acute an...If $A$ is an acute angle of a right triangle, then the cosine of angle $A$ is the ratio of the length of the side adjacent to angle $A$ over the length of the hypotenuse. If $A$ is an acute angle of a right triangle, then the tangent of angle $A$ is the ratio of the length of the side opposite angle $A$ over the length of the side adjacent to .
15.1: Operations with Rational Expressions
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/15%3A_Rational_Expressions/15.01%3A_Operations_with_Rational_Expressions
10.3: Compound Inequalities and Absolute Value
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/10%3A_Solving_Equations_and_Inequalities/10.03%3A_Compound_Inequalities_and_Absolute_Value
2: Fractions and Mixed Numbers
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/02%3A_Fractions_and_Mixed_Numbers
10.1.2: Adding and Subtracting Whole Numbers
https://math.libretexts.org/Courses/Fullerton_College/Math_100%3A_Liberal_Arts_Math_(Claassen_and_Ikeda)/10%3A_Appendix/10.01%3A_Whole_Numbers/10.1.02%3A_Adding_and_Subtracting_Whole_Numbers
10.1.2.2: Subtracting Whole Numbers and Applications
https://math.libretexts.org/Courses/Fullerton_College/Math_100%3A_Liberal_Arts_Math_(Claassen_and_Ikeda)/10%3A_Appendix/10.01%3A_Whole_Numbers/10.1.02%3A_Adding_and_Subtracting_Whole_Numbers/10.1.2.02%3A_Subtracting_Whole_Numbers_and_Applications
To subtract the digits in the hundreds place, regroup 3 thousands as 2 thousands, 10 hundreds and add the 10 hundreds to the 1 hundred that is already in the hundreds place. In addition to subtracting...To subtract the digits in the hundreds place, regroup 3 thousands as 2 thousands, 10 hundreds and add the 10 hundreds to the 1 hundred that is already in the hundreds place. In addition to subtracting using the standard algorithm, subtraction can also can be accomplished by writing the numbers in expanded form so that both the minuend and the subtrahend are written as the sums of their place values.
18.1.1: Introduction to Exponential Functions
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/18%3A_Exponential_and_Logarithmic_Functions/18.01%3A_Exponential_Functions/18.1.01%3A_Introduction_to_Exponential_Functions
For example, the compound interest formula is $A=P\left(1+\frac{r}{m}\right)^{m t}$ , where $P$ is the principal (the initial investment that is gathering interest) and $A$ is the amount of money...For example, the compound interest formula is $A=P\left(1+\frac{r}{m}\right)^{m t}$ , where $P$ is the principal (the initial investment that is gathering interest) and $A$ is the amount of money you would have, with interest, at the end of $t$ years, using an annual interest rate of $r$ (expressed as a decimal) and $m$ compounding periods per year.
12.3.1: Solve Quadratic Equations by Factoring
https://math.libretexts.org/Bookshelves/Applied_Mathematics/Developmental_Math_(NROC)/12%3A_Factoring/12.03%3A_Solving_Quadratic_Equations/12.3.01%3A_Solve_Quadratic_Equations_by_Factoring
To find the roots of this equation, apply the Principle of Zero Products and set each factor, $\ (x-5)$ and $\ (2 x+7)$ , equal to 0. $\ x-5=0$ , so $\ x=5$ ; you also find that $\ 2 x+7=0$ , so...To find the roots of this equation, apply the Principle of Zero Products and set each factor, $\ (x-5)$ and $\ (2 x+7)$ , equal to 0. $\ x-5=0$ , so $\ x=5$ ; you also find that $\ 2 x+7=0$ , so $\ 2 x=-7$ , and $\ x=\frac{-7}{2}$ . When you use the Principle of Zero Products to solve a quadratic equation, you need to make sure that the equation is equal to zero.

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