Answer:
Part 4) k=1/2
Part 5) k=-2/3
Part 6) y=32
Part 7) x=6
Part 8) v=99
Part 9)b=6
Part 10) y=6
Explanation:
we know that
A relationship between two variables, x, and y, represent a proportional variation if it can be expressed in the form
or
In a proportional relationship the constant of proportionality k is equal to the slope m of the line and the line passes through the origin
Part 4) Find the value of the constant of proportionality k
we have
Remember that the value of k is the same that the value of the slope
so
Part 5) Find the value of the constant of proportionality k
we have
Remember that the value of k is the same that the value of the slope
so
Part 6) Suppose that y varies directly with x, and y=16 when x=8. Find y when x=16
step 1
Find the value of the constant of proportionality k
step 2
Find the equation of the direct variation
substitute the value of k
step 3
Find y when x=16
Part 7) Suppose that y varies directly with x, and y=21 when x=3. Find x when y=42
step 1
Find the value of the constant of proportionality k
step 2
Find the equation of the direct variation
substitute the value of k
step 3
Find x when y=42
solve for x
Part 8) Suppose that v varies directly with g, and v=36 when g=4. Find v when g=11
step 1
Find the value of the constant of proportionality k
step 2
Find the equation of the direct variation
substitute the value of k
step 3
Find v when g=11
Part 9) Suppose that a varies directly with a, and a=7 when b=2. Find b when a=21
step 1
Find the value of the constant of proportionality k
step 2
Find the equation of the direct variation
substitute the value of k
step 3
Find b when a=21
solve for b
Part 10) Suppose that y varies directly with x, and y=9 when x=3/2. Find y when x=1
step 1
Find the value of the constant of proportionality k
step 2
Find the equation of the direct variation
substitute the value of k
step 3
Find y when x=1
