Answer:

(13)/(56) represents the division of 13 by 56, and (5)/(7) represents the division of 5 by 7. To calculate (13)/(56)+(5)/(7), we need to perform the following steps:

Step 1: Calculate (13)/(56) To divide 13 by 56, we can write it as a decimal or fraction. Let’s go with the fraction form for simplicity.

(13)/(56) can be simplified further by finding the greatest common divisor (GCD) of 13 and 56, which is 1. Divide both the numerator and denominator by 1 to simplify the fraction.

(13)/(56) = 13/56

Step 2: Calculate (5)/(7) Similarly, we need to find the division of 5 by 7. Let’s keep it in fraction form.

(5)/(7) is already in its simplest form, so we don’t need to simplify it any further.

Step 3: Add (13)/(56) and (5)/(7) To add fractions, we need a common denominator. In this case, the common denominator is the product of the denominators, which is 56 * 7 = 392.

Now, we’ll adjust the numerators to match the common denominator:

(13)/(56) = (13 * 7)/(56 * 7) = 91/392

(5)/(7) = (5 * 56)/(7 * 56) = 280/392

Now, we can add the fractions:

(13)/(56) + (5)/(7) = (91/392) + (280/392) = (91 + 280)/392 = 371/392

Finally, let’s simplify the fraction 371/392 by finding the GCD of 371 and 392, which is 1. Divide both the numerator and denominator by 1 to simplify the fraction.

371/392 cannot be simplified any further.

So, (13)/(56)+(5)/(7) is equal to 371/392.

I hope this explanation clarifies how to calculate (13)/(56)+(5)/(7). If you have any further questions, feel free to ask!