Given the sum 85, rewrite 35+50 using their GCF and multiplication.(1 point)
5 is the answer, i got u.
The GCF of 35 and 50 is 5. To rewrite 35+50 using their GCF and multiplication, we divide both numbers by 5 and multiply by the GCF:
35 ÷ 5 = 7
50 ÷ 5 = 10
GCF(35, 50) = 5
Therefore, 35 + 50 can be rewritten as 7(5) + 10(5) = 7(5) + 10(5) = 35 + 50 = 85.
To rewrite 35 + 50 using their greatest common factor (GCF) and multiplication, we first need to find the GCF of 35 and 50. The prime factorization of 35 is 5 * 7, while the prime factorization of 50 is 2 * 5 * 5. The only common factor they have is 5.
To rewrite 35 + 50, we can rewrite both terms by multiplying them by their GCF, which is 5.
35 * 5 + 50 * 5 = 175 + 250 = 425
So, 35 + 50 = 425 using their GCF and multiplication.
To rewrite the sum 35 + 50 using their greatest common factor (GCF) and multiplication, we need to find the GCF of 35 and 50 first.
Step 1: Find the factors of both numbers.
The factors of 35 are 1, 5, 7, 35.
The factors of 50 are 1, 2, 5, 10, 25, 50.
Step 2: Find the common factors of both numbers.
The common factors of 35 and 50 are 1 and 5.
Step 3: Determine the GCF.
The greatest common factor of 35 and 50 is 5.
Now, let's rewrite 35 + 50 using their GCF and multiplication.
35 + 50 can be rewritten as:
5 * 7 + 5 * 10
Since both terms have a common factor of 5, we can factor it out.
5 * (7 + 10)
Finally, we calculate the sum inside the parentheses:
5 * 17
Therefore, the expression 35 + 50 can be rewritten as 5 * 17.