the equation 26+0.25p=c gives the cost c in dollars that a store charges to deliver an an appliance that weighs p pounds. Use the equation and a table to find the weight of an appliance that costs $61 to deliver
To find the weight of an appliance that costs $61 to deliver, we can substitute the given cost ($61) into the equation and solve for the weight.
Let's substitute c = $61 in the equation:
26 + 0.25p = 61
Subtracting 26 from both sides:
0.25p = 61 - 26
0.25p = 35
Now, dividing both sides by 0.25 to isolate p:
p = 35 / 0.25
p = 140
Therefore, the weight of an appliance that costs $61 to deliver is 140 pounds.
To find the weight of an appliance that costs $61 to deliver, we can use the given equation:
26 + 0.25p = c
Substituting c = $61 into the equation, we get:
26 + 0.25p = 61
Now, we can solve for p.
First, let's subtract 26 from both sides of the equation:
0.25p = 61 - 26
0.25p = 35
Next, divide both sides of the equation by 0.25 to isolate p:
p = 35 / 0.25
p = 140
Therefore, the weight of an appliance that costs $61 to deliver is 140 pounds.
To find the weight of an appliance that costs $61 to deliver, we can substitute the given cost c of $61 into the equation 26 + 0.25p = c and solve for p.
First, let's rewrite the equation:
26 + 0.25p = 61
To solve for p, we'll isolate the variable p on one side of the equation.
Subtract 26 from both sides:
0.25p = 61 - 26
0.25p = 35
To isolate p, we need to divide both sides of the equation by 0.25:
p = 35 / 0.25
Dividing 35 by 0.25, we find:
p = 140
Therefore, the weight of an appliance that costs $61 to deliver is 140 pounds.