To solve this problem, we can distribute and simplify each term:
First, let's distribute and simplify the first term:
1/2 * z + 1/2 * 4 = 1/2 * z + 2 = z/2 + 2
Next, let's distribute and simplify the second term:
3 * 1/4z + 3 * 1 = 3/4z + 3
Now, let's subtract the two terms:
(z/2 + 2) - (3/4z + 3)
Next, let's find a common denominator for the fractions in the equation. The common denominator for 2 and 4 is 4. Multiply every term by 4 to get rid of the denominators:
(4 * z/2 + 4 * 2) - (4 * 3/4z + 4 * 3)
This simplifies to:
(2z + 8) - (3z + 12)
Now, let's expand the equation:
2z + 8 - 3z - 12
Combining like terms:
(2z - 3z) + (8 - 12) = -z - 4
Therefore, the final answer is -z - 4.
Subtract 1/2 (z + 4) - 3 (1/4z +1). Use fractions in final form.
3 answers
use fractions in final form
Sure, to write the final answer in fraction form, we can use the least common denominator approach. The least common denominator for the fractions involved is 4z.
Subtracting the fractions:
(1/2)z - (3/4)z + 4
To find a common denominator, multiply the numerator and denominator of the first fraction by 2 and the numerator and denominator of the second fraction by 4:
(2/4)z - (12/4)z + 4
Now, we can combine the fractions:
(2z - 12z) / 4z + 4
Simplifying the numerator:
(-10z) / 4z + 4
Now, let's simplify the denominator:
4z + 4
Therefore, the final answer is (-10z) / (4z + 4).
Subtracting the fractions:
(1/2)z - (3/4)z + 4
To find a common denominator, multiply the numerator and denominator of the first fraction by 2 and the numerator and denominator of the second fraction by 4:
(2/4)z - (12/4)z + 4
Now, we can combine the fractions:
(2z - 12z) / 4z + 4
Simplifying the numerator:
(-10z) / 4z + 4
Now, let's simplify the denominator:
4z + 4
Therefore, the final answer is (-10z) / (4z + 4).