he number of block has 9 in the ones place. the number in the hundreds place is one more than the number in the tens place, those two numbers equal 11. how many blocks are there?
659 is the number, but not how many blocks there are.
596
To determine the number of blocks, let's break down the given information and solve step by step.
We know that the number in the ones place is 9. So, this number can be represented as " _ _ 9 ".
The information also states that the number in the hundreds place is one more than the number in the tens place, and the sum of the tens place and hundreds place equals 11. Let's use variables for the unknown numbers.
The number in the tens place can be represented as " _ x 9 ", where x is the variable for the number in the tens place.
The number in the hundreds place is one more than the number in the tens place. Therefore, the number in the hundreds place can be represented as " (x + 1) x 9 ".
The sum of the tens place and hundreds place is 11. So, we can write an equation: x + (x + 1) = 11.
Simplifying the equation, we get:
2x + 1 = 11
Subtracting 1 from both sides:
2x = 10
Dividing both sides by 2:
x = 5
Therefore, the number in the tens place is 5, and the number in the hundreds place is 6.
So, the number of blocks can be represented as "6 5 9", and there are 659 blocks.