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irrational number.pdf

This document discusses square roots and irrational numbers. It provides examples of taking the square root of integers and explains that the square of an integer is a perfect square, while the opposite operation of taking the square root. It also defines rational and irrational numbers, stating that square roots of perfect squares are rational, while square roots of non-perfect squares are irrational. Examples are given of estimating square roots and identifying numbers as rational or irrational.

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Square Roots and Irrational Numbers
1 2 3 2 1 1 = 2 2 4 = 2 3 9 = The square of an integer is a perfect square. The opposite of squaring a number is taking the square root.
Example  For example asks what number multiplied by itself is equal to 81? That number is 9. Is there another solution to that problem? 81
Example  For example asks what number multiplied by itself is equal to 81? That number is 9. Is there another solution to that problem? Yes, -9 is also a solution. 81
Simplify each square root 100 16 − Click to the next slide to see solutions.
Simplify each square root  Click to the next slide to see solutions. 100 16 − 10
Simplify each square root 100 16 − 10 -4
Squares and Roots 2 2 2 2 2 2 2 2 2 2 2 2 1 1 2 4 3 9 4 16 5 25 6 36 7 49 8 64 9 81 10 100 11 121 12 144 = = = = = = = = = = = = 1 1 4 2 9 3 16 4 25 5 36 6 49 7 64 8 81 9 100 10 121 11 144 12 = = = = = = = = = = = =
Note!!! Notice that squares and square roots are inverses (opposites) of each other.
Estimating Square Roots Once you memorized squares and their roots, we can estimate square roots that are not perfect squares  For example, what about 8
Estimating Square Roots  We find the two perfect squares that are before and after the square root of 8. . .  and  Look at them on a number line: 4 9 5 4 9 6 7 8 3 2 2 3
Estimating square roots  We can see that is between 2 and 3 but is closer to 3. We would say that is approximately 3. 4 5 9 6 7 8 3 2 2 3 8 8
TRY THIS: Estimate to the nearest whole number 27 78 − 50 Click to the next slide to see if you are right!
TRY THIS: Estimate to the nearest whole number 27 78 − 50 5 -9 7
 Rational number- can be written as a fraction  Irrational number- cannot be written as a fraction because: •it is a non-terminating decimal •it is a decimal that does NOT repeat * The square roots of ALL perfect squares are rational. * The square roots of numbers that are NOT perfect squares are irrational.
Try This: Identify each number as rational or irrational 2 81 − 0.53 0.627 13.875931...
Identify each number as rational or irrational. 2 81 − 0.53 0.627 13.875931... Irrational Rational Rational Rational Irrational

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irrational number.pdf

  • 1.
  • 2.
    1 2 3 2 1 1 =2 2 4 = 2 3 9 = The square of an integer is a perfect square. The opposite of squaring a number is taking the square root.
  • 3.
    Example  For example askswhat number multiplied by itself is equal to 81? That number is 9. Is there another solution to that problem? 81
  • 4.
    Example  For example askswhat number multiplied by itself is equal to 81? That number is 9. Is there another solution to that problem? Yes, -9 is also a solution. 81
  • 5.
    Simplify each squareroot 100 16 − Click to the next slide to see solutions.
  • 6.
    Simplify each squareroot  Click to the next slide to see solutions. 100 16 − 10
  • 7.
    Simplify each squareroot 100 16 − 10 -4
  • 8.
    Squares and Roots 2 2 2 2 2 2 2 2 2 2 2 2 11 2 4 3 9 4 16 5 25 6 36 7 49 8 64 9 81 10 100 11 121 12 144 = = = = = = = = = = = = 1 1 4 2 9 3 16 4 25 5 36 6 49 7 64 8 81 9 100 10 121 11 144 12 = = = = = = = = = = = =
  • 9.
    Note!!! Notice that squaresand square roots are inverses (opposites) of each other.
  • 10.
    Estimating Square Roots Onceyou memorized squares and their roots, we can estimate square roots that are not perfect squares  For example, what about 8
  • 11.
    Estimating Square Roots We find the two perfect squares that are before and after the square root of 8. . .  and  Look at them on a number line: 4 9 5 4 9 6 7 8 3 2 2 3
  • 12.
    Estimating square roots We can see that is between 2 and 3 but is closer to 3. We would say that is approximately 3. 4 5 9 6 7 8 3 2 2 3 8 8
  • 13.
    TRY THIS: Estimate tothe nearest whole number 27 78 − 50 Click to the next slide to see if you are right!
  • 14.
    TRY THIS: Estimate tothe nearest whole number 27 78 − 50 5 -9 7
  • 15.
     Rational number-can be written as a fraction  Irrational number- cannot be written as a fraction because: •it is a non-terminating decimal •it is a decimal that does NOT repeat * The square roots of ALL perfect squares are rational. * The square roots of numbers that are NOT perfect squares are irrational.
  • 16.
    Try This: Identifyeach number as rational or irrational 2 81 − 0.53 0.627 13.875931...
  • 17.
    Identify each numberas rational or irrational. 2 81 − 0.53 0.627 13.875931... Irrational Rational Rational Rational Irrational