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Identify the location of the values square root of 11, square root of 8, and twenty two ninths on the number line.
Number line with points plotted at two and four tenths labeled Point A, two and eight tenths labeled Point B, and three and three tenths labeled Point C.

Point A is square root of 11, point B is square root of 8, and point C is twenty-two ninths.
Point A is twenty-two ninths, point B is square root of 8, and point C is square root of 11.
Point A is twenty-two ninths, point B is square root of 11, and point C is square root of 8.
Point A is square root of 11, point B is twenty-two ninths, and point C is square root of 8.



Answer :

The correct option regarding the points representing the rational numbers is given as follows:

Point A is twenty-two ninths, point B is square root of 8, and point C is square root of 11.

What are rational numbers?

Rational numbers are numbers that can have values that are either negative, zero or positive, and can also be non-decimal or decimal. What all these numbers have in common is that they can be represented by fractions.

For this problem, we have that:

  • The square root of 11 is between 3 and 4, as 3² = 9 < 11 and 4² = 16 > 11.
  • The square root of 8 is between 2 and 3, as 2² = 4 < 8 and 3² = 9 > 8.
  • The decimal equivalent to 22/9 is 2.45, as it is the result of the division of 22 by 9.

The points are located at:

  • A: 2.4.
  • B: 2.8.
  • C: 3.3.

Hence the correct option is:

Point A is twenty-two ninths, point B is square root of 8, and point C is square root of 11.

More can be learned about rational numbers at brainly.com/question/13325494

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