Azman and Ahmad are each given some ice cream to sell. It Azman sells 51 ice cream per hour and Ahmad sells 17 ice cream per hour, Azman will have 48 ice cream left when Ahmad has sold all his ice cream. However, if Ahmad sells 42 ice cream per hour and Azman sells 28 ice cream per hour, Azman will have 384 ice cream left when Ahmad has sold all his ice cream. How many more ice cream does Azman have to sell than Ahmad?
496
Well, it seems like Azman and Ahmad sure have quite the interesting ice cream-selling dynamic going on. Let's see if we can crunch the numbers and find out how many more ice creams Azman has to sell than Ahmad.
In the first scenario, Azman sells 51 ice creams per hour and Ahmad sells 17. We know that when Ahmad finishes selling, Azman has 48 ice creams left. So, let's assume they both work for x hours. The equation for this scenario would be:
51x - 17x = 48
Simplifying that, we have:
34x = 48
Dividing both sides by 34, we find that x = 1.41 (approximately).
Now, in the second scenario, Azman sells 28 ice creams per hour and Ahmad sells 42. We know that when Ahmad finishes selling, Azman has 384 ice creams left. Using the same approach as before, we have:
28x - 42x = 384
Simplifying that, we have:
-14x = 384
Dividing both sides by -14, we find that x = -27.43 (approximately).
Wait a minute, I hear you say! Negative hours for selling ice cream? That can't be right! You're absolutely correct. The negative result means that the two scenarios presented are inconsistent or impossible to satisfy simultaneously. So, it seems there's something fishy about these ice cream numbers.
Without any more information or a consistent scenario, it's not possible to accurately determine how many more ice creams Azman has to sell than Ahmad. It's a real ice cream mystery!
Let's assume that Azman and Ahmad each start with the same number of ice creams, which we'll call "x."
If Azman sells 51 ice creams per hour and Ahmad sells 17 ice creams per hour, it will take Ahmad x/17 hours to sell all his ice creams. During this time, Azman will have sold 51 * (x/17) ice creams.
In this scenario, Azman will have 48 ice creams left when Ahmad has sold all his ice cream, so we can write the equation:
x - 51 * (x/17) = 48.
Simplifying the equation gives:
17x - 51x = 48 * 17,
-34x = 48 * 17,
-34x = 816,
x = 816 / -34,
x = -24.
Since the number of ice creams cannot be negative, we made an incorrect assumption. Let's try again with different ice cream values.
If Ahmad sells 42 ice creams per hour and Azman sells 28 ice creams per hour, it will take Ahmad x/42 hours to sell all his ice creams. During this time, Azman will have sold 28 * (x/42) ice creams.
In this scenario, Azman will have 384 ice creams left when Ahmad has sold all his ice cream, so we can write the equation:
x - 28 * (x/42) = 384.
Simplifying the equation gives:
42x - 28x = 384 * 42,
14x = 16128,
x = 16128 / 14,
x = 1152.
Therefore, Azman has to sell 1152 - 1152 = 0 more ice cream than Ahmad.
To find out how many more ice cream Azman has to sell than Ahmad, we need to determine the difference in the number of ice creams sold by both of them.
Let's set up equations to solve the problem:
Let A = number of ice creams Azman has
Let B = number of ice creams Ahmad has
According to the first scenario:
A - 51h = B, where h is the number of hours it takes to sell all the ice creams.
According to the second scenario:
A - 28h = B + 384
To solve these equations, we can use substitution:
Substitute B from the first equation into the second equation:
A - 28h = A - 51h + 384
Now we can solve for h:
23h = 384
h = 384 / 23
h ≈ 16.6957
Since the number of hours cannot be a fraction, we can round h to the nearest whole number. Hence, h = 17.
Now, substitute the value of h back into the first equation to find the number of ice creams:
A - 51 * 17 = B
A - 867 = B
Similarly, substitute the value of h into the second equation:
A - 28 * 17 = B + 384
A - 476 = B + 384
Let's solve these two equations simultaneously to find the values of A and B:
A - 867 = B
A - 476 = B + 384
Subtract the second equation from the first equation:
(-867) - (-476) = B - (B + 384)
-867 + 476 = B - B - 384
-391 = -384
-391 ≠ -384 (The equation is inconsistent)
It seems there is no solution to this problem. Please double-check the information provided in your question to ensure its accuracy.