4 2 rules of radicals-x
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Rules of Radicals
Rules of Radicals
All variables are assumed to be non-negative in the following discussion.
Square Rule: x2 =x x = x. Rules of Radicals
All variables are assumed to be non-negative in the following discussion.
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
Rules of Radicals
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions.
Rules of Radicals
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 =
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 =
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
All variables are assumed to be non-negative in the following discussion.
The square number 4 is a factor of 8.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
All variables are assumed to be non-negative in the following discussion.
The square number 4 is a factor of 8.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =
All variables are assumed to be non-negative in the following discussion.
The square number 36is a factor of 72.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362
All variables are assumed to be non-negative in the following discussion.
The square number 36is a factor of 72.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
All variables are assumed to be non-negative in the following discussion.
The square number 36is a factor of 72.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
c. x2y
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
c. x2y =x2y
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
c. x2y =x2y = xy
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
d. x2y3
c. x2y =x2y = xy
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
d. x2y3 =x2y2y
c. x2y =x2y = xy
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
d. x2y3 =x2y2y = xyy
c. x2y =x2y = xy
All variables are assumed to be non-negative in the following discussion.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
d. x2y3 =x2y2y = xyy
c. x2y =x2y = xy
All variables are assumed to be non-negative in the following discussion.
A radical expression is said to be simplified if as much as possible is extracted out of the radical.
Example A. Simplify
a. 8 = 42 = 22
Square Rule: x2 =x x = x. Multiplication Rule: x·y = x·y
We use these rules to simplify root-expressions. In particular, look for square factors 4, 9, 16, 25, 36,.. of the radicand to extract when simplifying square-root.
Rules of Radicals
b. 72 =362 = 62
d. x2y3 =x2y2y = xyy
c. x2y =x2y = xy
All variables are assumed to be non-negative in the following discussion.
(For example 72 =98 = 38 are not simplified, but 62 is.)
A radical expression is said to be simplified if as much as possible is extracted out of the radical.
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet)
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
We may simplify a radical expression by extracting roots out of the radical in steps. Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2
Rules of Radicals
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of RadicalsWe may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
We may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
Example C. Simplify.
We may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
Example C. Simplify.
94a.
We may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
Example C. Simplify.
94
94a. =
We may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
Example C. Simplify.
94
94
32a. = =
We may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
Example C. Simplify.
94
94
32
9y2x2
a. = =
b.
We may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
Example C. Simplify.
94
94
32
9y2x2
9y2
x2
a. = =
b. =
We may simplify a radical expression by extracting roots out of the radical in steps.
Example B. Simplify.
a. 72 = 4 18 = 218 (not simplified yet) = 292 = 2*3*2 = 62 (simplified)b.80x4y5 = 16·5x4y4y = 4x2y25y
Rules of Radicals
Division Rule: yx
yx =
Example C. Simplify.
94
94
32
9y2x2
9y2
x2
3yx
a. = =
b. = =
We may simplify a radical expression by extracting roots out of the radical in steps.
The root of a fraction is said to be simplified if the denominator does not have any root-terms.
Rules of Radicals
Example D. Simplify
53a.
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free.
Rules of Radicals
Example D. Simplify
53a.
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
Example D. Simplify
53a.
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
a. =
Multiple an extra 5 to extract root to make denominator to be root-free.
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
a. = =2515
Multiple an extra 5 to extract root to make denominator to be root-free.
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
a. = =2515
= 5
15
Multiple an extra 5 to extract root to make denominator to be root-free.
Simplified! Became the denominator is root-free (and the numerator is simplified).
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
a. = =2515
= 5
15
Multiple an extra 5 to extract root to make denominator to be root-free.
Simplified! Became the denominator is root-free (and the numerator is simplified).
51 15or
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
a. = =2515
= 5
15
8x5b.
51 15or
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
a. = =2515
= 5
15
8x5
4·2x5b. =
51 15or
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
51 15or
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
51 15or
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
51 15or
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
= 4x10x
51 15or
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
= 4x10x
51 15or
4x1 10xor
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
= 4x10x
WARNING!!!!a ± b = a ±b
51 15or
4x1 10xor
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
= 4x10x
WARNING!!!!a ± b = a ±bFor example: 4 + 913 =
51 15or
4x1 10xor
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
= 4x10x
WARNING!!!!a ± b = a ±bFor example: 4 + 913 =
51 15or
4x1 10xor
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
= 4x10x
WARNING!!!!a ± b = a ±bFor example: 4 + 9 = 4 +913 =
51 15or
4x1 10xor
Example D. Simplify
53
5·53·5
The root of a fraction is said to be simplified if the denominator does not have any root-terms. If not, the denominator needs to be changed to be root free. If the denominator does contain radical terms, multiply the top and bottom by suitably chosen quantities to remove the radical term in the denominator.
Rules of Radicals
2
a. = =2515
= 5
15
8x5
4·2x5b. = =
2x5
=
2 2x5
2x2x
= 2 2x
10x*
= 4x10x
WARNING!!!!a ± b = a ±bFor example: 4 + 9 = 4 +9 = 2 + 3 = 513 =
51 15or
4x1 10xor
Rules of RadicalsExercise A. Simplify the following radicals. 1. 12 2. 18 3. 20 4. 28
5. 32 6. 36 7. 40 8. 45
9. 54 10. 60 11. 72 12. 8413. 90 14. 96x2 15. 108x3 16. 120x2y2
17. 150y4 18. 189x3y2 19. 240x5y8 18. 242x19y34
19. 12 12 20. 1818 21. 2 16
23. 183
22. 123
24. 1227 25. 1850 26. 1040
27. 20x15x 28.12xy15y29. 32xy324x5 30. x8y13x15y9
Exercise B. Simplify the following radicals. Remember thatyou have a choice to simplify each of the radicals first then multiply, or multiply the radicals first then simplify.
Rules of RadicalsExercise C. Simplify the following radicals. Remember thatyou have a choice to simplify each of the radicals first then multiply, or multiply the radicals first then simplify. Make sure the denominators are radical–free.
8x531. x
10 145x32. 7
20 51233. 15
8x534. 3
2 332x35. 7
5 5236. 29
x
x(x + 1)39. x
(x + 1) x(x + 1)40. x(x + 1)
1
1(x + 1)37.
x(x2 – 1)41. x(x + 1)
(x – 1)
x(x + 1)38.
x21 – 1Exercise D. Take the denominators of out of the radical.
42. 9x21 – 143.
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