Given the equation [tex] |x-72.5|=4 [/tex].
When x is maximum, we have
[tex] |x-72.5|= x-72.5 [/tex]. Hence [tex] x-72.5 =4\\x=76.5 [/tex]
The maximum temperature is [tex] 76.5\; ^oF [/tex]
When x is minimum, we have
[tex] |x-72.5|=72.5-x [/tex]. Hence [tex] 72.5-x =4\\x=68.5 [/tex]
The minimum temperature is [tex] 68.5\; ^oF [/tex]
Answer:
Therefore the minimum and maximum temperature in the house are 68.5°F and 76.5°F respectively
Step-by-step explanation:
Given the equation that relates the minimum and maximum temperature of heat of a house as;
|x – 72.5| = 4
Since the function at the left hand side is an absolute value, the equation can be expressed in two ways because the modulus function can either be a negative function (for minimum temperature) or positive function (maximum temperature).
The equation can be rewritten the following ways;
-(x-72.5) = 4 ...1 OR
x-72.5 = 4 ... 2
Solving equation 1 to get x;
-x+72.5 = 4
-x = 4-72.5
-x = -68.5
x = 68.5°F (minimum temperature)
Solving equation 2 for x;
x-72.5 = 4
x = 4+72.5
x = 76.5°F (maximum temperature)
Therefore the minimum and maximum temperature in the house are 68.5°F and 76.5°F respectively
