i am greater than 40 but less than 50. i am 5 times a number. who am i?
How many multiple of 5 can you think of that lie between 40 and 50 ?
25
To find the number, we can set up an equation. Let's call the number "x."
We know that the number is greater than 40 but less than 50. Therefore, we can write the inequality: 40 < x < 50.
We also know that the number is 5 times another number: x = 5 * y.
Since we don't know the value of "y," we can't solve the equation directly. However, based on the given information, we can determine that the number must be a multiple of 5 between 40 and 50.
So, the possible values for the number "x" are: 45 or 50.
Thus, the number you are looking for could be either 45 or 50.
To find the answer to this question, we can follow a step-by-step approach:
1. Start by identifying the range between 40 and 50 (exclusive). This range consists of the numbers 41, 42, 43, 44, 45, 46, 47, 48, and 49.
2. The unknown number in this problem is the one that we need to multiply by 5 to get the answer. Let's call this number "x".
3. The problem states that the unknown number is 5 times "x". Therefore, we can write the equation as "5x".
4. We also know that the unknown number is greater than 40 and less than 50, so we can set up the inequality: 40 < 5x < 50.
5. Dividing the entire inequality by 5, we get: 8 < x < 10.
6. Now, looking at the range of possible values for "x" (8 to 10), let's find the corresponding values for 5x: 5(8) = 40, and 5(9) = 45.
7. Based on these solutions, we can determine that the answer is the number "45."
Therefore, the answer to the question "I am greater than 40 but less than 50. I am 5 times a number. Who am I?" is 45.