Step-by-step explanation:
First we find square root of 6200 by division method.
49<62<64
142×2=284
145×5=725
146×6=876
147×7=1029
148×8=1184
149×9=1341>1300
Hence. (78)
2
<6200<(79)
Since remainder is not zero; 6200 is not a perfect square number,
We calculate =(79)
−6200=6241−6200=41
So the least number to be added is 41, we get
6200+41=6241=(79)
a perfect square.
Answer:
The main point of simplification (to the simplest radical form of 6250) is to get the number 6250 inside the radical sign √ as low as possible.
√6250 = √2 × 5 × 5 × 5 × 5 × 5 = 25√10
Therefore, the answer is 25√10.
Since 6250 isn't a perfect square (its square root will have an infinite number of decimals), it is an irrational number
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Step-by-step explanation:
First we find square root of 6200 by division method.
49<62<64
142×2=284
145×5=725
146×6=876
147×7=1029
148×8=1184
149×9=1341>1300
Hence. (78)
2
<6200<(79)
2
Since remainder is not zero; 6200 is not a perfect square number,
We calculate =(79)
2
−6200=6241−6200=41
So the least number to be added is 41, we get
6200+41=6241=(79)
2
a perfect square.
Answer:
Step-by-step explanation:
The main point of simplification (to the simplest radical form of 6250) is to get the number 6250 inside the radical sign √ as low as possible.
√6250 = √2 × 5 × 5 × 5 × 5 × 5 = 25√10
Therefore, the answer is 25√10.
Since 6250 isn't a perfect square (its square root will have an infinite number of decimals), it is an irrational number