Kentucky Math

Conceptual Category Number and Quantity: Number and Quantity—The Real Number System

Cluster: Extend the properties of exponents to rational exponents.

HS.N.1

Fully covered

Extend the properties of integer exponents to rational exponents, allowing for the expression of radicals in terms of rational exponents. (MP.2, MP.7)

Exponential equation with rational answer
Fractional exponents
Intro to rational exponents
Rational exponents challenge
Rewriting roots as rational exponents
Unit-fraction exponents

HS.N.2

Mostly covered

Rewrite expressions involving radicals and rational exponents using the properties of exponents. (MP.7)

Equivalent forms of exponential expressions
Equivalent forms of exponential expressions
Evaluate radical expressions challenge
Evaluating fractional exponents
Evaluating fractional exponents: fractional base
Evaluating fractional exponents: negative unit-fraction
Evaluating mixed radicals and exponents
Evaluating quotient of fractional exponents
Exponential equation with rational answer
Fractional exponents
Intro to rational exponents
Properties of exponents (rational exponents)
Properties of exponents intro (rational exponents)
Rational exponents challenge
Rewrite exponential expressions
Rewriting exponential expressions as A⋅Bᵗ
Rewriting mixed radical and exponential expressions
Rewriting quotient of powers (rational exponents)
Rewriting roots as rational exponents
Simplify square roots
Simplify square roots (variables)
Simplify square-root expressions
Simplifying square roots
Simplifying square roots (variables)
Simplifying square roots review
Simplifying square-root expressions
Solve exponential equations using exponent properties
Solve exponential equations using exponent properties (advanced)
Solving exponential equations using exponent properties
Solving exponential equations using exponent properties (advanced)
Unit-fraction exponents

Cluster: Use properties of rational and irrational numbers.

Justify why the sum or product of two rational numbers is rational; that the sum of a rational number and an irrational number is irrational; and that the product of a nonzero rational number and an irrational number is irrational. (MP.3, MP.6)

Proof: √2 is irrational
Proof: product of rational & irrational is irrational
Proof: square roots of prime numbers are irrational
Proof: sum & product of two rationals is rational
Proof: sum of rational & irrational is irrational
Proof: there's an irrational number between any two rational numbers
Rational vs. irrational expressions
Sums and products of irrational numbers
Worked example: rational vs. irrational expressions
Worked example: rational vs. irrational expressions (unknowns)

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US-KY

Math

Kentucky Math

Conceptual Category Number and Quantity: Number and Quantity—The Real Number System

Cluster: Extend the properties of exponents to rational exponents.

HS.N.1

HS.N.2

Cluster: Use properties of rational and irrational numbers.

HS.N.3(+)

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US-KY

Math

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