|
|
A quick distribution of a radical into the sum of two numerical terms, one whole and one radical as well.
|
|
|
The combining of like factors from two radicals into one and then the simplification of the result.
|
|
|
This includesradicals that contain variable factors, but continues the simplification of various terms in a sum or difference so that possible like terms can be added orsubtracted.
|
|
|
This shows how to simplify square roots in an additon problem so that hopefully you get like terms and con simplify further.
|
|
|
This demonstrates how to solve an equation where two radicals are equal and there are no other terms on either side of th equation
|
|
|
This demonstrates the squaring of a binomial with radical terms and the multiplication of conjugates (sum and differences of the same terms)
|
|
|
Demonstrates distribution when radicals are invovled.
|
|
|
Demonstrations that emphasize the fact that a fraction bar acts like parentheses in that the each part of the fraction must be factored so that there is a product of factors on both top and bottomof…
|
|
|
A demonstration of squaring a binomial with radical terms and then a second example showing how conjugate binomials can be multiplied.
|
|
|
A quick look at distributin a radical across a sum of a whole number and a different radical
|
|
|
A qucikc look at a simple fourth root of a combined pair of them, numbers only.
|
|
|
Two examples of reducing radicals to then be able add or subtract like radicals
|
|
|
Two examples showing the addition or subtraction of like radicals
|