The two-digit positive integers with a tens digit of 3 are:
30 31 32 33 34 35 36 37 38 39
Chat with our AI personalities
there are no 3 digit tis two digit! :) * * * * * 90 of them.
A three digit number is a number that has 3 digits. Example 382 3 is the hundred digit. 8 is the tens digit. 2 is the ones digit.
There are infinitely many such numbers. One is 4568231432.756
That means multiply it by 2. If your tens digit is 3, your ones digit is 6.
69
The answer depends on what the tens digit is greater than, and what the ones digit does then.
there are no 3 digit tis two digit! :) * * * * * 90 of them.
A three digit number is a number that has 3 digits. Example 382 3 is the hundred digit. 8 is the tens digit. 2 is the ones digit.
For the tens digit to be a prime number then it must equal 2, 3, 5 or 7. There are four 3-digit prime numbers that fit the above condition and also have the tens and units digits forming a 2-digit prime number. 131, 137, 173, 179. The person supplying the question may like to sum the various combinations.
There are infinitely many such numbers. One is 4568231432.756
The digit in the tens place in the number 33.55 is the first digit 3.
That means multiply it by 2. If your tens digit is 3, your ones digit is 6.
69
a number has more ones than tens. the value of the tens digit is 60. what are the possibel numbers?
194
Is it only 890 and 891
There are 900 3-digit numbers, 100 to 999. The 3 may be in the hundreds place, the tens place, or the ones. The numbers 300 - 399 have 3 in the hundreds place. The numbers 130, 131 ... 938, 939 have 3 in the tens place. The numbers 103, 113, 123 ... 993 have 3 in the ones place. That would total 100 + 90 + 90 = 280 except that now we have double counted some numbers with 2 or more threes in them. I believe if you count carefully you will find 19 double counted numbers in the 300 - 399 group and 8 numbers with the tens digit and ones digit equal to 3. Lastly, the number 333 was triple counted. 280 - 28 = 252. There are several ways to solve this problem. I encourage you to double-check my results ... who is to say this is correct?