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Exponents and Scientific Notation
MATH 017
Intermediate Algebra
S. Rook
2
Overview
• Section 5.1 in the textbook– Product rule for exponents– Expressions raised to the 0 power– Quotient rule for exponents– Expressions raised to negative powers– Scientific notation
Product Rule
4
Product Rule
• Consider x4 ∙ x5
x∙x∙x∙x ∙ x∙x∙x∙x∙x
x9
• Product Rule: xa ∙ xb = xa+b – When multiplying LIKE BASES, add the
exponents– Only applies when the operation is
multiplication
5
Product Rule (Example)
Ex 1: Simplify: (4xy2)(2x2y3)
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Product Rule (Example)
Ex 2: Simplify: (-x2y5z)(7x4z3)
Expressions Raised to the 0 Power
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Expressions Raised to the 0 Power
• Consider x0
– As long as x ≠ 0, x0 = 1– x can also be an expression
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Expressions Raised to the 0 Power (Example)
Ex 3: (2w)0
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Expressions Raised to the 0 Power (Example)
Ex 4: -(x2y3z2)0
Quotient Rule
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Quotient Rule
• Consider x5 / x2
x∙x∙x∙x∙x / x∙x
x3
• Quotient Rule: xa / xb = xa-b – When dividing LIKE BASES, subtract the
exponents– Only applies when the operation is division
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Quotient Rule (Example)
Ex 5: Simplify:
zyx
zyx23
243
48
40
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Quotient Rule (Example)
Ex 6: Simplify:
24
78
28
16
ts
trs
Expressions with Negative Exponents
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Expressions with Negative Exponents
• Consider x2 / x6
x-4 by the quotient rulex∙x / x∙x∙x∙x∙x∙x1 / x4
• We NEVER leave an expression with a negative exponent
• Flipping an exponent and its base from the numerator into the denominator (or vice versa) reverses the sign of the exponent
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Expressions with Negative Exponents (Continued)
• x-4 = x-4 / 1 = 1 / x4
• 2-3 = 2-3 / 1 = 1 / 23 = 1 / 8 ≠ -8– The sign of the exponent DOES NOT affect
the sign of the coefficient (or base)– Whenever using the quotient rule, the initial
result goes into the numerator
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Expressions with Negative Exponents (Example)
Ex 7: Simplify – leave NO negative exponents:
342
242
12
2
tsr
tsr
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Expressions with Negative Exponents (Example)
Ex 8: Simplify – leave NO negative exponents:
yx
yx2
43
14
4
Scientific Notation
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Scientific Notation
• Scientific Notation: any number in the form of a x 10b where -10 < a < 10, a ≠ 0 and b is an integer– One non-zero number to the left of the
decimal point – the rest to the right– Count how many places and in which
direction the decimal is moved• If to the left, b is positive• If to the right, b is negative
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Scientific Notation (Example)
Ex 9: Write in scientific notation:
0.000135
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Scientific Notation (Example)
Ex 10: Write in scientific notation:
451,000
24
Standard Notation
• Standard Notation: writing a number with a product of a power of ten without the power of ten– Take the decimal and move it:
• To the right if b is positive• To the left if b is negative• Fill in empty spots with zeros
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Standard Notation (Example)
Ex 11: Write in standard notation:
1.155 x 104
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Standard Notation (Example)
Ex 12: Write in standard notation:
29.3 x 10-3
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Summary
• After studying these slides, you should know how to do the following:– Apply the product rule when multiplying like bases– Evaluate expressions raised to the 0 power– Apply the quotient rule when dividing like bases– Simplify expressions raised to negative powers– Convert back and forth between scientific and
standard notation
