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1. To simplify the expression m^2 + m - 12/m^2 - 16, we can first factor the denominator as (m+4)(m-4) to get:

(m^2 + m - 12)/((m+4)(m-4))
Factor the numerator as (m+4)(m-3) to get:

((m+4)(m-3))/((m+4)(m-4))
(m - 3)/(m - 4)

2. If p and q vary inversely, it means that p = k/q where k is a constant. Given that p=14 when q=4, we can find k:

14 = k/4
k = 56

Now, we can find p when q=8:

p = 56/8
p = 7

3. To simplify the expression x^2-49/x - 2 • x^2 - 5x + 6/x^2+ 4x-21, we can first factor all the denominators:

(x^2-49)/(x) - 2 • (x^2-5x+6)/(x^2+4x-21)
(x+7)(x-7)/(x) - 2 • (x-3)(x-2)/(x-3)(x+7)
(x-7) - 2(x-2)/(x)
(x-7 - 2x + 4)/x
(-x - 3)/x

4. Since Malik's weekly pay varies directly with the number of hours worked, we can write a direct variation equation as:

weekly pay = (hourly pay rate) * (number of hours)

Given that his weekly pay is $229.50 when he works 17 hours, we can find the hourly pay rate:

229.50 = hourly pay rate * 17
hourly pay rate = 229.50/17
hourly pay rate ≈ $13.50

Now, we can find his weekly salary when he works 23 hours:

weekly pay = $13.50 * 23
weekly pay = $310.50

5. To simplify the expression y=x+1/x^2-6x-7, we can first factor the denominator:

y=x+1/((x-7)(x+1))
y=x+1/(x^2-6x-7)
y=x+1/((x-7)(x+1))