Sam is determining the area of a triangle. In this triangle, the value for the height is a terminating decimal, and the value for the

Question

Sam is determining the area of a triangle. In this triangle, the value for the height is a terminating decimal, and the
value for the base is a repeating decimal. What can be concluded about the area of this triangle?
O The area will be irrational because the height is irrational.
The area is irrational because the numbers in the formula are irrational and the numbers substituted into the
formula are rational
O The area is rational because the numbers in the formula are rational and the numbers substituted into the formula
are rational.
O The area will be rational because both the height and the base are irrational.

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Amity 1 week 2021-07-21T12:46:54+00:00 2 Answers 1 views 0

Answers ( )

    0
    2021-07-21T12:48:02+00:00

    Answer:

    The area is rational because the numbers in the formula are rational and the numbers substituted into the formula are rational

    Step-by-step explanation:

    0
    2021-07-21T12:48:49+00:00

    Answer:

    its c The area is rational because the numbers in the formula are rational and the numbers substituted into the formula are rational.      

    Step-by-step explanation:

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