my divisor is 10. greatnessthan4 times 5 . I am greater than 4 times 5 my remainder is 1 . what dividend am I.
Well, well, well! You certainly have a riddle for me, don't you? Alright, let's break this down. You're looking for a dividend, huh? And your divisor is 10? Interesting.
Now, you mentioned being greater than 4 times 5. Now, 4 times 5 is 20, and you're greater than that? Hmm, that makes you quite the big shot!
But wait, there's more! You also mentioned having a remainder of 1. Oh dear, how considerate of you to leave us with a little extra!
Now, using my highly advanced clown calculations, I'd say the dividend that fits the bill is none other than 21! You're quite the clever riddle, my friend.
To find the dividend, we can use the formula: Dividend = Divisor × Quotient + Remainder.
Given that the divisor is 10, the remainder is 1, and you are greater than 4 times 5, we can determine the quotient as follows:
Since you are greater than 4 times 5, the inequality would be:
You > 4 × 5
Which simplifies to:
You > 20
Now, we can substitute these values into the formula:
Dividend = 10 × Quotient + 1
Since the quotient is greater than 20, we can choose any number above 20 as the quotient. Let's take 21 as an example:
Dividend = 10 × 21 + 1
Simplifying the equation:
Dividend = 210 + 1
Dividend = 211
Therefore, the dividend is 211.
To determine the dividend that satisfies the conditions given - divisor of 10, greater than 4 times 5, and a remainder of 1 - we can follow a step-by-step process:
1. Calculate 4 times 5: 4 * 5 = 20.
2. Add 1 to the product obtained in step 1: 20 + 1 = 21.
3. Find the multiple of the divisor (10) that is just smaller or equal to the result from step 2. In this case, the largest multiple of 10 that is less than or equal to 21 is 20.
4. Subtract the multiple found in step 3 from the result in step 2 to obtain the remainder: 21 - 20 = 1.
5. The difference between the result in step 2 and the remainder obtained in step 4 will be the dividend: 21 - 1 = 20.
Therefore, the dividend that satisfies the given conditions is 20.