PLEASE ANSWET ASAP! -Brainlist to right answer
Ashton estimates the square root of 50 in the following way: √50 = 2 √25 = 2 x 5 = 10

A- Explain why his reasoning is incorrect.

B- Estimate the square root of 50 to the nearest tenth without using your calculator.
SHOW YOUR WORK

A -

By saying SQRT(50) = (2) X SQRT(25) is wrong because

(2) X SQRT(25) = SQRT(4) X SQRT(25)
= SQRT (100)

B -

To estimate the square room of 50, we have to break 50 into multiples like 1 X 50, 2X25
The ideal multiple should consist at least one integer that can be square root into an integer. Now, let’s start with the multiples of 50.

1 X 50, 2 X 25, 5 X 10,

The most deal multiple is 2 X 25 as it contains an integer 25, that can be squareroot into another integer.
Hence, it will be
SQRT(2) X SQRT(25) =
SQRT (2) X 5 = (1.41) X 5 = 7.05

PLEASE ANSWET ASAP! -Brainlist to right answer Ashton estimates the square root of 50 in the following way: √50 = 2 √25 = 2 x 5 = 10 A- Explain why his reasoning is incorrect. B- Estimate the square root of 50 to the nearest tenth without using your calculator. SHOW YOUR WORK

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PLEASE ANSWET ASAP! -Brainlist to right answer
Ashton estimates the square root of 50 in the following way: √50 = 2 √25 = 2 x 5 = 10

A- Explain why his reasoning is incorrect.

B- Estimate the square root of 50 to the nearest tenth without using your calculator.
SHOW YOUR WORK