Take two digits, 0 and 1. Make the smallest 4-digit number using both the digits equal number of times. *
1 point
(a) 1001
(b) 1010
(c) 1100
(d) 0011
Answers
Answer:
(a)1001
Step-by-step explanation:
Reason:
(b) 1010 is greater than 1001
(c) 1100 is greater than all of the given options
(d) 0011 is not a four digit number
Please mark as BRAINLIEST
Given,
The two given digits are = 0 and 1
To find,
The smallest 4-digit number using both the digits equal number of times.
Solution,
We can simply solve this mathematical problem by using the following mathematical process.
Now, there are two given digits and the final number will be of 4 digits.
As, each of the given digits will be present for equal number of times in the final number. So, each digit will be present for = (4÷2) = 2 times in the final number.
So, the final number will be formed by 0,0,1 and 1.
Now, we have to find out the smallest 4 digit number by the previously mentioned 4 digits (ie. 0,0,1 and 1).
Smallest number is generally created by writing the digits in ascending order. Here, the smallest digit is 0, but we cannot start the final number with a zero, because zero as the first digit of the number has no numerical value, so eventually the digits of the number will be reduced. (eg. 0123 = 123)
That's why, we have to start the number with 1. Rest of the digits will be arranged in ascending order.
So,
First digit = 1
Rest of the digits in ascending order = 0,0,1
Final number = 1001
Hence, the required number will be 1001 (option a).