The solutions are:
- 8936/37 = 241 19/37
- The prime factorization of 144 is 2 x 2 x 2 x 2 x 3 x 3
- The value of (49/7)^3 - 4 * 56 + (13 + 9 - 4) is 137
- The value of 7x + 5/4x - 19 is 7x + 5/4x - 19
How to evaluate the expressions?
Question 1
Here, we have:
8936 / 37
To do this, we make use of a calculator.
Using the calculator, we have:
8936/37 = 241 19/37
Question 2
Here, we have:
Prime factorization of 144
This means that we determine the factor of 144.
So, we have:
144 = 2 x 2 x 2 x 2 x 3 x 3
Hence, the prime factorization of 144 is 2 x 2 x 2 x 2 x 3 x 3
Question 3
Here, we have:
(49/7)^3 - 4 * 56 + (13 + 9 - 4)
Evaluate the expressions in the bracket
So, we have:
(49/7)^3 - 4 * 56 + (13 + 9 - 4) = 7^3 - 4 * 56 + 18
Also, we have:
(49/7)^3 - 4 * 56 + (13 + 9 - 4) = 343 - 224 + 18
Evaluate the sum and the difference
(49/7)^3 - 4 * 56 + (13 + 9 - 4) = 137
Hence, the value of (49/7)^3 - 4 * 56 + (13 + 9 - 4) is 137
Question 4
Here, we have:
7x + 5/4x - 19
The value of y is given as
y = 9
There is no occurrence of y = 9 in 7x + 5/4x - 19
Hence, the value of 7x + 5/4x - 19 is 7x + 5/4x - 19
Read more about expressions at:
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