|
Shows how to separate out the persct square so they can become whole numbers or expression leaving the remaining factors under the square root.
|
|
This demonstrates how to transform variables with negative exponents into corresponding reciprocal fractions, and then proceed to simplify the resulting complex fraction by multiplying all terms by…
|
|
A multil-variable example where we can gather together like factors and then multiply them as numbers or by adding their exponents. If any negative exponents occur, then the definition of a negative…
|
|
This describes how to solve each side of a compound inequality, then using the graphs of each part determine the interval notation for the entire compound statement.
|
|
A quick demonstration of how to interpret a line graph of a compound inequality and write its algebraic form.
|
|
Multiplication of two radicals by pairing all numbers after prime factorization and taking half of all even exponents with variables as a base.
|
|
Simplification of two fractions withing a larger fraction. Both fractions have only multiplied factors in both numerator and denominator.
|
|
This shows the last step in simplifying a rational expression, i.e. dividing out factors that reduce to one.
|