the product of a 1 digit number and a 2-digit number number is 284 what is the answer
Thenos are 4 & 71
4 x 71 = 284
factors of 284
2 x 142
4 x 71
--> no others since 71 is prime
so your choice for the described condition is
4 x 71
4×71=284
I need more lessons from maths
To find the answer, we need to determine the specific numbers that, when multiplied together, give us a product of 284.
Let's break this down step by step:
Step 1: Find the factors of 284.
The factors of 284 are the numbers that divide evenly into it without leaving a remainder. By trying different numbers as divisors, we can find the factors. However, to make it more efficient, we can start by trying smaller numbers first.
We can start by dividing 284 by 1:
284 ÷ 1 = 284
The result is a whole number, so 1 is a factor of 284.
Next, we try dividing 284 by 2:
284 ÷ 2 = 142
Again, the result is a whole number, so 2 is also a factor of 284.
We can continue this process and try dividing 284 by higher numbers until we find all the factors.
Step 2: Determine the 1-digit number and 2-digit number combination.
Since the product of a 1-digit number and a 2-digit number is 284, we need to find a combination of factors that includes a 1-digit number and a 2-digit number.
Looking at the factors we found for 284, we see that there is a pair of numbers that satisfies this condition: 2 and 142.
Step 3: Multiply the numbers together to get the answer.
Now that we have found the combination, we can multiply the numbers together to get the answer:
2 × 142 = 284
Therefore, the answer is 284.
So the 1-digit number is 2, and the 2-digit number is 142.