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Radical Expressions and Rational Exponents
Mathematics 17
Institute of Mathematics, University of the Philippines-Diliman
Lecture 5
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Outline
1 Radical Expressionsnth root of a
Simplification of Radical ExpressionsOperations Involving Radical Expressions
Addition and Subtraction of Radical Expressions
Multiplication and Division of Radical Expressions
Rationalizing Radical Expressions
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nth root of a
Definition
Let a, b ∈ R and n ∈ N, n > 1. If bn = a then b is an nth root of a.
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nth root of a
Definition
Let a, b ∈ R and n ∈ N, n > 1. If bn = a then b is an nth root of a.
Examples:Since both 32, (−3)2 are equal to 9, then 3 and -3 are second roots orsquare roots of 9.
-4 is a third root or a cube root of -64 since (−4)3 = −64.
2 and -2 are fourth roots of 16 since (−2)4
= (2)4
= 16.
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 3 / 23
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Principal nth root of a
Definition
If n ∈ N, n > 1, a ∈ R, the principal nth root of a, denoted n
√ a, is defined
as follows:
If a > 0, then n
√ a is the nth root of a that is positive.
If a < 0 and n is odd, then n√ a is the nth root of a that is negative.
If a is zero, then n
√ 0 = 0.
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Principal nth root of a
Definition
If n ∈ N, n > 1, a ∈ R, the principal nth root of a, denoted n
√ a, is defined
as follows:
If a > 0, then n
√ a is the nth root of a that is positive.
If a < 0 and n is odd, then n√ a is the nth root of a that is negative.
If a is zero, then n
√ 0 = 0.
Note:
1. The principal nth root is unique.2. If n is even, the nth roots of negative real numbers are not real
numbers.
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 4 / 23
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Radical Expression
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Radical Expression
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Radical Expression
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Radical Expression
If no index is written, it is taken to be 2.
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4.
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
3 is the principal cube root of 27 since (3)3 = 27 and 3 is a positiveinteger. That is, 3√ 27 = 3.
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
3 is the principal cube root of 27 since (3)3 = 27 and 3 is a positiveinteger. That is, 3√ 27 = 3.3√ −27
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
3 is the principal cube root of 27 since (3)3 = 27 and 3 is a positiveinteger. That is, 3√ 27 = 3.3√ −27 = −3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
P i i l h f
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
3 is the principal cube root of 27 since (3)3 = 27 and 3 is a positiveinteger. That is, 3√ 27 = 3.3√ −27 = −32011√
0
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
P i i l h f
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
3 is the principal cube root of 27 since (3)3 = 27 and 3 is a positiveinteger. That is, 3√ 27 = 3.3√ −27 = −32011√
0 = 0
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
P i i l h f
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
3 is the principal cube root of 27 since (3)3 = 27 and 3 is a positiveinteger. That is, 3√ 27 = 3.3√ −27 = −32011√
0 = 0√ −
9
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
P i i l th t f
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Principal nth root of a
Examples:
4 and −4 are square roots of 16, but the principal square root of 16 is4. That is,
√ 16 = 4.
3 is the principal cube root of 27 since (3)3 = 27 and 3 is a positiveinteger. That is, 3√ 27 = 3.3√ −27 = −32011√
0 = 0√ −
9 is not a real number because there is no real number b suchthat b2 = −9.
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 6 / 23
R ti l E t f R di l E i
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Rational Exponents for Radical Expressions
Definition
If n is a positive integer and m is an integer such that mn is in lowestterms, then
a1
n = n
√ a, and
am
n = a1
nm
= ( n√
a)m
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 7 / 23
Rational Exponents for Radical Expressions
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Rational Exponents for Radical Expressions
Definition
If n is a positive integer and m is an integer such that mn is in lowestterms, then
a1
n = n
√ a, and
am
n = a1
nm
= ( n√
a)m
Examples:
1. 251/2 =√
25 = 5
2. 272/3 = ( 3√
27)2 = 32 = 9
3. (−32)1/5 = 5√ −32 = −2
4. −(32)1/5 = − 5√
32 = −2
5. 4−3/2 = (√
4)−3 = 2−3 = 1
8
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 7 / 23
Radical Expressions and Rational Exponents
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Radical Expressions and Rational Exponents
The laws of integral exponents can be extended to rational exponents:
Laws of Rational Exponents
Let a, b ∈ R, r, s ∈ Q.
ar · as = ar+s
ar
as = ar−s, a = 0
a−r = 1
ar, a = 0
(ar)s = ars, a ≥ 0
(ab)r = arbra
b
r=
ar
br , b = 0
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Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:
1. (x1/2 + y
1/2)(x1/2 − y
1/2)
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:
1. (x1/2 + y
1/2)(x1/2 − y
1/2)
= (x1/2)2 − (y
1/2)2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:
1. (x1/2 + y
1/2)(x1/2 − y
1/2)
= (x1/2)2 − (y
1/2)2
= x − y
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:1. (x
1/2 + y1/2)(x
1/2 − y1/2)
= (x1/2)2 − (y
1/2)2
= x − y
2. a + a1
/2 − a
1
/3
a2/3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:1. (x
1/2 + y1/2)(x
1/2 − y1/2)
= (x1/2)2 − (y
1/2)2
= x − y
2. a + a1
/2 − a
1
/3
a2/3
= a
a2/3+
a1/2
a2/3− a
1/3
a2/3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:1. (x
1/2 + y1/2)(x
1/2 − y1/2)
= (x1/2)2 − (y
1/2)2
= x − y
2. a + a1
/2 − a
1
/3
a2/3
= a
a2/3+
a1/2
a2/3− a
1/3
a2/3
= a1/3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:1. (x
1/2 + y1/2)(x
1/2 − y1/2)
= (x1/2)2 − (y
1/2)2
= x − y
2. a + a1
/2 − a
1
/3
a2/3
= a
a2/3+
a1/2
a2/3− a
1/3
a2/3
= a1/3 + a−
1/6
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Radical Expression and the Rational Exponents
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Radical Expression and the Rational Exponents
Examples:1. (x
1/2 + y1/2)(x
1/2 − y1/2)
= (x1/2)2 − (y
1/2)2
= x − y
2. a + a1
/2 − a
1
/3
a2/3
= a
a2/3+
a1/2
a2/3− a
1/3
a2/3
= a1/3 + a−
1/6
−a−
1/3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Radical Expression and the Rational Exponents
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p p
Examples:1. (x
1/2 + y1/2)(x
1/2 − y1/2)
= (x1/2)2 − (y
1/2)2
= x − y
2. a + a1
/2
− a1
/3
a2/3
= a
a2/3+
a1/2
a2/3− a
1/3
a2/3
= a1/3 + a−
1/6
−a−
1/3
= a1/3 + 1a1/6
− 1a1/3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 9 / 23
Simplification of Radical Expressions
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p p
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Simplification of Radical Expressions
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p p
We use the following properties:
Theorem
Let m, n ∈ N, n > 1 for any a, b ∈ R with a, b ≥ 0 if n is even.n
√ an = a;
n
√ ank = ak, k
∈Z
n√ ab = n√ a · n√ bn
a
b =
n
√ a
n
√ b
, b = 0
n
√ am = a
m/n
n
m√ a = mn√ a
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 10 / 23
Simplification of Radical Expressions
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p p
Examples:1.√
2 · √ 18 =√
2 · 18 =√
36 = 6
2.3√
543√
2= 3
54
2 = 3
√ 27 = 3
3.
4√
x
3
= x
3/4
(x ≥ 0 if the index is even.)
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 11 / 23
Simplification of Radical Expressions
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Examples:1.√
2 · √ 18 =√
2 · 18 =√
36 = 6
2.3√
543√
2= 3
54
2 = 3
√ 27 = 3
3.
4√
x3
= x
3/4
(x≥ 0 if the index is even.)
Note: if n is even, am/n = n
√ am is true only if a ≥ 0. If a < 0, the
statement is not necessarily true.
Example: 43/2 = (√ 4)3 = 23 = 8 and √ 43 = √ 64 = 8
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 11 / 23
Simplification of Radical Expressions
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Examples:
1.√
2 · √ 18 =√
2 · 18 =√
36 = 6
2.3√
543√
2= 3
54
2 = 3
√ 27 = 3
3.
4√
x3
= x
3/4
(x≥ 0 if the index is even.)
Note: if n is even, am/n = n
√ am is true only if a ≥ 0. If a < 0, the
statement is not necessarily true.
Example: 43/2 = (√ 4)3 = 23 = 8 and √ 43 = √ 64 = 8
(−1)6/2 = (−1)3 = −1 but
(−1)6 =√
1 = 1
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Simplification of Radical Expressions
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A radical expression is in simplest form if all the following conditionsare satisfied:
The radicand has no factors which are perfect powers of the index n.
The radicand is positive for radicals with odd indices.
The radicand is not a fraction. (Rationalize the denominator.)
The smallest possible index is used.
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 12 / 23
Simplification of Radicals
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The radicand has no factors which are perfect powers of the index n.
Example: 18x3y2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 13 / 23
Simplification of Radicals
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The radicand has no factors which are perfect powers of the index n.
Example: 18x3y2
=
32 · 2 · x2 · x · y2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 13 / 23
Simplification of Radicals
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The radicand has no factors which are perfect powers of the index n.
Example: 18x3y2
=
32 · 2 · x2 · x · y2
=√
32 · √ 2 ·√
x2 · √ x ·
y2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 13 / 23
Simplification of Radicals
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The radicand has no factors which are perfect powers of the index n.
Example: 18x3y2
=
32 · 2 · x2 · x · y2
=√
32 · √ 2 ·√
x2 · √ x ·
y2
= 3xy√
2x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 13 / 23
Simplification of Radicals
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The radicand is positive for radicals with odd indices.
Example: 3 −8x7y2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 14 / 23
Simplification of Radicals
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The radicand is positive for radicals with odd indices.
Example: 3 −8x7y2
= 3
(−2)3 · x6 · x · y2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 14 / 23
Simplification of Radicals
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The radicand is positive for radicals with odd indices.
Example: 3 −8x7y2
= 3
(−2)3 · x6 · x · y2
= 3
(−2)3 · 3√
x6 · 3√ x · 3
y2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 14 / 23
Simplification of Radicals
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The radicand is positive for radicals with odd indices.
Example: 3 −8x7y2
= 3
(−2)3 · x6 · x · y2
= 3
(−2)3 · 3√
x6 · 3√ x · 3
y2
= −2x2 3
xy2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 14 / 23
Simplification of Radicals
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The radicand is not a fraction. (Rationalize the denominator.)
Example: 3
10y4
3x2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 15 / 23
Simplification of Radicals
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The radicand is not a fraction. (Rationalize the denominator.)
Example: 3
10y4
3x2
= 3
10y4
3x2 · 3
2x
32x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 15 / 23
Simplification of Radicals
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The radicand is not a fraction. (Rationalize the denominator.)
Example: 3
10y4
3x2
= 3
10y4
3x2 · 3
2x
32x =
3
90xy4
33 · x3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 15 / 23
Simplification of Radicals
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The radicand is not a fraction. (Rationalize the denominator.)
Example: 3
10y4
3x2
= 3
10y4
3x2 · 3
2x
32x =
3
90xy4
33 · x3 =
3
90xy · y3
3√
33 · x3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 15 / 23
Simplification of Radicals
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The radicand is not a fraction. (Rationalize the denominator.)
Example: 3
10y4
3x2
= 3
10y4
3x2 · 3
2x
32x =
3
90xy4
33 · x3 =
3
90xy · y3
3√
33 · x3
= y 3√
90xy
3x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 15 / 23
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The smallest possible index is used.
Example: 4√
9
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32 = 32/4
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32 = 32/4 = 31/2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32 = 32/4 = 31/2 =√
3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32 = 32/4 = 31/2 =√
3
Example: 6√ 16x4
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32 = 32/4 = 31/2 =√
3
Example: 6√ 16x4 = 6
(2x)4
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32 = 32/4 = 31/2 =√
3
Example: 6√ 16x4 = 6
(2x)4 = 3
(2x)2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
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The smallest possible index is used.
Example: 4√
9 = 4√
32 = 32/4 = 31/2 =√
3
Example: 6√ 16x4 = 6
(2x)4 = 3
(2x)2 = 3√ 4x2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 16 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Examples:
1. 4√
3 − 5√
12 + 2√
75
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Examples:
1. 4√
3 − 5√
12 + 2√
75= 4
√ 3−
5(2√
3) + 2(5√
3)
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Examples:
1. 4√
3 − 5√
12 + 2√
75= 4
√ 3−
5(2√
3) + 2(5√
3)
= 4√ 3 − 10√ 3 + 10√ 3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Examples:
1. 4√
3 − 5√
12 + 2√
75= 4
√ 3−
5(2√
3) + 2(5√
3)
= 4√ 3 − 10√ 3 + 10√ 3= 4
√ 3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Examples:
1. 4√
3 − 5√
12 + 2√
75= 4
√ 3−
5(2√
3) + 2(5√
3)
= 4√ 3 − 10√ 3 + 10√ 3= 4
√ 3
2. 5√
x3 −√
121x3 +√
16x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Examples:
1. 4√
3 − 5√
12 + 2√
75= 4
√ 3−
5(2√
3) + 2(5√
3)
= 4√ 3 − 10√ 3 + 10√ 3= 4
√ 3
2. 5√
x3 −√
121x3 +√
16x= 5x
√ x
−11x
√ x + 4
√ x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Addition and Subtraction of Radical Expressions
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Radicals with the same index and radicand can be added or subtracted.
Examples:
1. 4√
3 − 5√
12 + 2√
75= 4
√ 3−
5(2√
3) + 2(5√
3)
= 4√ 3 − 10√ 3 + 10√ 3= 4
√ 3
2. 5√
x3 −√
121x3 +√
16x= 5x
√ x
−11x
√ x + 4
√ x
= −6x√ x + 4√ x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 17 / 23
Multiplication and Division of Radical Expressions
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If radicals have the same index, we use
n
√ a· n
√ b
=
n
√ ab
and
n
√ a
n√ b =
n ab
Examples:
1. 3
3x2y · 3√ 36x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
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If radicals have the same index, we use
n
√ a· n
√ b
=
n
√ ab
and
n
√ a
n√ b =
n ab
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y·
36x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
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Multiplication and Division of Radical Expressions
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If radicals have the same index, we use
n
√ a· n
√ b
=
n
√ ab
and
n
√ a
n√ b =
n ab
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y·
36x = 3 33 · 22
·x3
·y
= 3x 3√ 4y
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
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If radicals have the same index, we use n
√ a· n
√ b = n
√ ab and
n
√ a
n√ b= n a
b
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y·
36x = 3 33 · 22
·x3
·y
= 3x 3√ 4y
2.
√ 15x · √ 2x√
6x3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
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If radicals have the same index, we use n
√ a· n
√ b = n
√ ab and
n
√ a
n√ b= n a
b
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y·
36x = 3 33 · 22
·x3
·y
= 3x 3√ 4y
2.
√ 15x · √ 2x√
6x3
=
√ 15x
·2x
√ 6x3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
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If radicals have the same index, we use n
√ a· n
√ b = n
√ ab and
n
√ a
n√ b= n a
b
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y
·36x = 3 33 · 22
·x3
·y
= 3x 3√ 4y
2.
√ 15x · √ 2x√
6x3
=
√ 15x
·2x
√ 6x3 =
√ 30x2
√ 6x3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
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If radicals have the same index, we use n
√ a· n
√ b = n
√ ab and
n
√ a
n√ b= n a
b
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y
·36x = 3 33 · 22
·x3
·y
= 3x 3√ 4y
2.
√ 15x · √ 2x√
6x3
=
√ 15x
·2x
√ 6x3 =
√ 30x2
√ 6x3 = 30x2
6x3
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
![Page 77: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/77.jpg)
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If radicals have the same index, we use n
√ a· n
√ b = n
√ ab and
n
√ a
n√ b= n a
b
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y
·36x = 3 33 · 22
·x3
·y
= 3x 3√ 4y
2.
√ 15x · √ 2x√
6x3
=
√ 15x
·2x
√ 6x3 =
√ 30x2
√ 6x3 = 30x2
6x3 = 5
x · x
x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
![Page 78: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/78.jpg)
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If radicals have the same index, we use n
√ a· n
√ b = n
√ ab and
n
√ a
n√ b= n a
b
Examples:
1. 3
3x2y · 3√ 36x
= 3 3x2y
·36x = 3 33 · 22
·x3
·y
= 3x 3√ 4y
2.
√ 15x · √ 2x√
6x3
=
√ 15x
·2x
√ 6x3 =
√ 30x2
√ 6x3 = 30x2
6x3 = 5
x · x
x
=
√ 5x
x
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 18 / 23
Multiplication and Division of Radical Expressions
![Page 79: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/79.jpg)
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If radicals have different indices, we first make their indices the same byfinding the LCM of all the indices, then using n
√ a = nm
√ am.
Example:√
2 · 4√ 8
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 19 / 23
Multiplication and Division of Radical Expressions
![Page 80: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/80.jpg)
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If radicals have different indices, we first make their indices the same byfinding the LCM of all the indices, then using n
√ a = nm
√ am.
Example:√
2 · 4√ 8LCM of indices: 4
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 19 / 23
Multiplication and Division of Radical Expressions
![Page 81: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/81.jpg)
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If radicals have different indices, we first make their indices the same byfinding the LCM of all the indices, then using n
√ a = nm
√ am.
Example:√
2 · 4√ 8LCM of indices: 4
√ 2 · 4√ 8 = 4√ 22 · 4√ 8
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 19 / 23
Multiplication and Division of Radical Expressions
![Page 82: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/82.jpg)
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If radicals have different indices, we first make their indices the same byfinding the LCM of all the indices, then using n
√ a = nm
√ am.
Example:√
2 · 4√ 8LCM of indices: 4
√ 2 · 4√ 8 = 4
√ 22 · 4√ 8= 4
4(8)
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 19 / 23
Multiplication and Division of Radical Expressions
![Page 83: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/83.jpg)
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If radicals have different indices, we first make their indices the same byfinding the LCM of all the indices, then using n
√ a = nm
√ am.
Example:√
2 · 4√ 8LCM of indices: 4
√ 2 · 4√ 8 = 4
√ 22 · 4√ 8= 4
4(8)
= 4√
32
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 19 / 23
Multiplication and Division of Radical Expressions
![Page 84: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/84.jpg)
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If radicals have different indices, we first make their indices the same byfinding the LCM of all the indices, then using n
√ a = nm
√ am.
Example:√
2 · 4√ 8LCM of indices: 4
√ 2 · 4√ 8 =
4
√ 22 · 4√ 8
= 4
4(8)
= 4√
32
= 4√
25
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 19 / 23
Multiplication and Division of Radical Expressions
![Page 85: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/85.jpg)
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If radicals have different indices, we first make their indices the same byfinding the LCM of all the indices, then using n
√ a = nm
√ am.
Example:√
2 · 4√ 8LCM of indices: 4
√ 2 · 4√ 8 =
4
√ 22 · 4√ 8
= 4
4(8)
= 4√
32
= 4√
25
= 2 4√
2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 19 / 23
Rationalizing a Denominator
![Page 86: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/86.jpg)
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If denominator consists of one radicalMultiply both the numerator and denominator by an expression that willmake the radicand of the denominator a perfect power of the index.
Example: 16x4
3z
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 20 / 23
Rationalizing a Denominator
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If denominator consists of one radicalMultiply both the numerator and denominator by an expression that willmake the radicand of the denominator a perfect power of the index.
Example: 16x4
3z
= 4x2
√ 3z
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 20 / 23
Rationalizing a Denominator
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If denominator consists of one radicalMultiply both the numerator and denominator by an expression that willmake the radicand of the denominator a perfect power of the index.
Example: 16x4
3z
= 4x2
√ 3z
·√
3z√ 3z
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 20 / 23
Rationalizing a Denominator
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If denominator consists of one radicalMultiply both the numerator and denominator by an expression that willmake the radicand of the denominator a perfect power of the index.
Example: 16x4
3z
= 4x2
√ 3z
·√
3z√ 3z
= 4x2
√ 3z√
32z2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 20 / 23
Rationalizing a Denominator
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If denominator consists of one radicalMultiply both the numerator and denominator by an expression that willmake the radicand of the denominator a perfect power of the index.
Example: 16x4
3z
= 4x2
√ 3z
·√
3z√ 3z
= 4x2
√ 3z√
32z2
=
4x2√
3z
3z
Math 17 (UP IMath) Radical Expressions and Rational Exponents Lec 5 20 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Math 17 (UP IMath) Radical Expressions and Rational Exponents Lec 5 21 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Example:
√ 3x +
√ 2x
√ 3x −√ 2x
=
√ 3x +
√ 2x√
3x −√ 2x
Math 17 (UP IMath) Radical Expressions and Rational Exponents Lec 5 21 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Example:
√ 3x +
√ 2x
√ 3x −√ 2x
=
√ 3x +
√ 2x√
3x −√ 2x
·
Math 17 (UP IMath) Radical Expressions and Rational Exponents Lec 5 21 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Example:
√ 3x +
√ 2x
√ 3x −√ 2x
=
√ 3x +
√ 2x√
3x −√ 2x
·√
3x +√
2x√ 3x +
√ 2x
Math 17 (UP IMath) Radical Expressions and Rational Exponents Lec 5 21 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Example:
√ 3x +
√ 2x
√ 3x −√ 2x
=
√ 3x +
√ 2x√
3x −√ 2x
·√
3x +√
2x√ 3x +
√ 2x
= (√
3x +√
2x)2
3x − 2x
Math 17 (UP IMath) Radical Expressions and Rational Exponents Lec 5 21 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
![Page 96: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/96.jpg)
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Example:
√ 3x +
√ 2x
√ 3x −√ 2x
=
√ 3x +
√ 2x√
3x −√ 2x
·√
3x +√
2x√ 3x +
√ 2x
= (√
3x +√
2x)2
3x − 2x
=
3x + 2√
3x
·2x + 2x
x
Math 17 (UP IMath) Radical Expressions and Rational Exponents Lec 5 21 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
![Page 97: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/97.jpg)
8/11/2019 A5 - Rational Exponents VJ
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Example:
√ 3x +
√ 2x
√ 3x −√ 2x
=
√ 3x +
√ 2x√
3x −√ 2x
·√
3x +√
2x√ 3x +
√ 2x
= (√
3x +√
2x)2
3x − 2x
=
3x + 2√
3x
·2x + 2x
x =
5x + 2x√
6
x
M th 17 (UP IM th) R di l E ssi s d R ti l E ts L 5 21 / 23
Rationalizing a Denominator
If denominator consists of two or more radicals
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To rationalize the denominator, use the special products:(x − y)(x + y) = x2 − y2
(x ± y)(x2 ∓ xy + y2) = x3 ± y3
Example:
√ 3x +
√ 2x
√ 3x −√ 2x
=
√ 3x +
√ 2x√
3x −√ 2x
·√
3x +√
2x√ 3x +
√ 2x
= (√
3x +√
2x)2
3x − 2x
=
3x + 2√
3x
·2x + 2x
x =
5x + 2x√
6
x
= 5 + 2√
6
M th 17 (UP IM th) R di l E i d R ti l E t L 5 21 / 23
Rationalizing a Denominator
Example: 1
2 − 3√
4
![Page 99: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/99.jpg)
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= 1
2 − 3√ 4
M th 17 (UP IM th) R di l E i d R ti l E t L 5 22 / 23
Rationalizing a Denominator
Example: 1
2 − 3√
41 4 3
√ 4
3√
42
![Page 100: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/100.jpg)
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= 1
2 − 3√ 4 · 4 + 2 3
√4 +
3√
42
4 + 2 3√ 4 + 3√ 42
M th 17 (UP IM th) R di l E i d R ti l E t L 5 22 / 23
Rationalizing a Denominator
Example: 1
2 − 3√
41 4 2 3
√ 4
3√
42
![Page 101: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/101.jpg)
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= 1
2 − 3√ 4 · 4 + 2 3
√4 +
3√
42
4 + 2 3√ 4 + 3√ 42
= 4 + 2 3
√ 4 +
3√
42
8 − 4
M h 17 (UP IM h) R di l E i d R i l E L 5 22 / 23
Rationalizing a Denominator
Example: 1
2 − 3√
41 4 + 2 3
√ 4 +
3√
42
![Page 102: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/102.jpg)
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= 1
2 − 3√ 4 · 4 + 2 3
√4 +
3√
42
4 + 2 3√ 4 + 3√ 42
= 4 + 2 3
√ 4 +
3√
42
8 − 4
= 4 + 2 3√ 4 +
3√ 42
4
M h 17 (UP IM h) R di l E i d R i l E L 5 22 / 23
Rationalizing a Denominator
Example: 1
2 − 3√
41 4 + 2 3
√ 4 +
3√
42
![Page 103: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/103.jpg)
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= 1
2 − 3√ 4 · 4 + 2 3
√4 +
√42
4 + 2 3√ 4 + 3√ 42
= 4 + 2 3
√ 4 +
3√
42
8 − 4
= 4 + 2 3√ 4 +
3√ 424
= 1 +3√
4
2 +
3√
16
4
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 22 / 23
Rationalizing a Denominator
Example: 1
2 − 3√
41 4 + 2 3
√ 4 +
3√
42
![Page 104: A5 - Rational Exponents VJ](https://reader034.fdocuments.us/reader034/viewer/2022052313/577cc58d1a28aba7119cc4ca/html5/thumbnails/104.jpg)
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= 1
2 − 3√ 4 · 4 + 2
√4 +
√42
4 + 2 3√ 4 + 3√ 42
= 4 + 2 3
√ 4 +
3√
42
8 − 4
= 4 + 2 3√ 4 +
3√ 424
= 1 +3√
4
2 +
3√
16
4
= 1 +3√
4
2 +
3√
2
2
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 22 / 23
Exercise:
Simplify the following. Rationalize the denominators.
24c−1/2d2/3
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1
24c / d /
18c−1/7d−3/5
2 (u1/3 + (uv)1/6 + v1/3)(u1/6 − v1/6)
3 3√ −84
4 4√
9x2
5
3√ 9a4b2
62√
5√ 8
+ 93√
16
7x2
−2x + 1
√ x + 1
81
3√
4 + 3√ −27
Math 17 (UP-IMath) Radical Expressions and Rational Exponents Lec 5 23 / 23