Answer :
Sure, let's work through the multiplication step-by-step to find the product of [tex]\( 4898 \)[/tex] and [tex]\( 913 \)[/tex].
1. Write the numbers vertically to multiply:
```
4898
× 913
```
2. Multiply 4898 by 3 (the unit digit of 913):
```
4898
× 3
__________
14694 (since 4898 × 3 = 14694)
```
3. Multiply 4898 by 1 (the tens digit of 913), but remember to add a zero at the end because we're actually multiplying by 10:
```
4898
× 10
__________
48980 (since 4898 × 10 = 48980, written as 48980)
```
4. Multiply 4898 by 9 (the hundreds digit of 913), but remember to add two zeros at the end because we're actually multiplying by 900:
```
4898
× 900
__________
4408200 (since 4898 × 900 = 4408200, written as 4408200)
```
5. Add all these partial results together:
```
14694 (partial result from multiplying by 3)
48980 (partial result from multiplying by 10)
+ 4408200 (partial result from multiplying by 900)
___________
4471874
```
So, the product of [tex]\( 4898 \)[/tex] and [tex]\( 913 \)[/tex] is [tex]\( 4,471,874 \)[/tex].
1. Write the numbers vertically to multiply:
```
4898
× 913
```
2. Multiply 4898 by 3 (the unit digit of 913):
```
4898
× 3
__________
14694 (since 4898 × 3 = 14694)
```
3. Multiply 4898 by 1 (the tens digit of 913), but remember to add a zero at the end because we're actually multiplying by 10:
```
4898
× 10
__________
48980 (since 4898 × 10 = 48980, written as 48980)
```
4. Multiply 4898 by 9 (the hundreds digit of 913), but remember to add two zeros at the end because we're actually multiplying by 900:
```
4898
× 900
__________
4408200 (since 4898 × 900 = 4408200, written as 4408200)
```
5. Add all these partial results together:
```
14694 (partial result from multiplying by 3)
48980 (partial result from multiplying by 10)
+ 4408200 (partial result from multiplying by 900)
___________
4471874
```
So, the product of [tex]\( 4898 \)[/tex] and [tex]\( 913 \)[/tex] is [tex]\( 4,471,874 \)[/tex].
