Let's determine the number of digits in the square roots of each given number step-by-step:
(a) For 848241:
1. First, we calculate the square root of 848241.
2. Upon finding the square root, identify its integer part.
3. Count the number of digits in this integer part.
From the calculations, the integer part of the square root has 3 digits.
(b) For 106276:
1. First, we calculate the square root of 106276.
2. Upon finding the square root, identify its integer part.
3. Count the number of digits in this integer part.
From the calculations, the integer part of the square root has 3 digits.
(c) For 5041:
1. First, we calculate the square root of 5041.
2. Upon finding the square root, identify its integer part.
3. Count the number of digits in this integer part.
From the calculations, the integer part of the square root has 2 digits.
(d) For 676:
1. First, we calculate the square root of 676.
2. Upon finding the square root, identify its integer part.
3. Count the number of digits in this integer part.
From the calculations, the integer part of the square root has 2 digits.
So, the number of digits in the square roots of the given numbers are:
(a) 848241: 3 digits
(b) 106276: 3 digits
(c) 5041: 2 digits
(d) 676: 2 digits
