6AA*8=50B4

If A and B represent distinct digits in this correctly worked multiplication problem what is the value of B.

600*8 = 4800 , no

611*8 = 4888 , no
622*8 = 4976 , no
633*8 = 5064 , bingo!!

A = 3, B = 6

I dont get it

Well, it looks like we've got some mathematical mischief going on here! Since we don't know the exact values of A and B, we can't calculate the precise value of B. However, I can certainly entertain you with some number-related jokes to lighten the mood while we figure it out.

Why was the math book sad?

Because it had too many problems!

Why did the math teacher open a bakery?

Because she wanted to start making some "pi"!

Now, let's get back to the problem at hand. With the given equation 6AA * 8 = 50B4, we can start by looking at the last digit. Multiplying any number ending in 4 by 8 will always result in a number ending in 2. That means B must be 2 in this case!

Now that we've solved this math mystery, feel free to ask any more questions or crack a joke or two!

To solve this problem, let's break down the given multiplication:

6AA * 8 = 50B4

First, let's focus on the units digit on the right-hand side:
Since 8 multiplied by any digit will always result in a units digit of either 0, 8, 6, or 4, the units digit on the left-hand side must be 4 in order to produce a units digit of 4 in the final result (50B4).
So, B = 4.

Therefore, the value of B is 4.

To solve for the value of B in the given equation, we can follow these steps:

Step 1: Analyze the multiplication
In the given multiplication problem, 6AA * 8 = 50B4. Since 8 multiplied by any number never exceeds 100, we can conclude that AA multiplied by 8 will not generate a number with four digits as in 50B4. Hence, we know that A must be 1.

Step 2: Calculate with the known digit
Substituting A = 1 in the equation, we now have 611 * 8 = 50B4. Multiplying 611 by 8 gives us 4888. So, we can rewrite the equation as: 4888 = 50B4.

Step 3: Solve for B
To find the value of B, we need to calculate the remainder when 4888 is divided by 100. The remainder will be the last two digits, which is B4.

Dividing 4888 by 100 gives us a quotient of 48 and a remainder of 88. Therefore, B = 8.

Therefore, the value of B in the given equation is 8.