Respuesta :
Hi there!
The 1ˢᵗ Step is to develop a relation between cost and time (in years).
∵ th' cost increases linearly, we know that the relation can be represented by the equation of a straight line, y = mx+b
where,
• y is the cost
• m is the rate of cost increase
• x is the year
• b is the initial cost of the time frame being analyzed.
∵ We're looking at the time between 1985 and 1995 :-
The initial cost will be the cost of the clothing in 1985, which is $620.
Next, the rate of increase of the cost can be found by the rise-over-run method.
∵ y is the cost and x is the time in years, the rise will be the change in cost and the run will be the change in time (years).
[tex]\bf {In \:other\: words}[/tex] :-
[tex]\dfrac { 1000 - 62}{1995 - 1985}[/tex] = $ 37.5 per year increase
Finally, th' relation:
y = 37.5x + 620
y = 37.5 × 6 + 620
y = $ 845
Hence,
The cost of family's clothing in 1991 is $ 845.
~ Hope it helps!
The 1ˢᵗ Step is to develop a relation between cost and time (in years).
∵ th' cost increases linearly, we know that the relation can be represented by the equation of a straight line, y = mx+b
where,
• y is the cost
• m is the rate of cost increase
• x is the year
• b is the initial cost of the time frame being analyzed.
∵ We're looking at the time between 1985 and 1995 :-
The initial cost will be the cost of the clothing in 1985, which is $620.
Next, the rate of increase of the cost can be found by the rise-over-run method.
∵ y is the cost and x is the time in years, the rise will be the change in cost and the run will be the change in time (years).
[tex]\bf {In \:other\: words}[/tex] :-
[tex]\dfrac { 1000 - 62}{1995 - 1985}[/tex] = $ 37.5 per year increase
Finally, th' relation:
y = 37.5x + 620
y = 37.5 × 6 + 620
y = $ 845
Hence,
The cost of family's clothing in 1991 is $ 845.
~ Hope it helps!
Answer:
The cost of this family’s clothing in 1991 is $ 848.
Step-by-step explanation:
Given,
The cost of clothing is increasing linearly,
Let the equation that represent the cost of clothing ( in dollars ) after x years since 1985,
y = mx + c
Given, for x = 0, y = 620,
⇒ 620 = m(0) + c
⇒ c = 620,
The number of years from 1985 to 1995 = 10 years,
So, if x = 10, y = 1000,
1000 = 10(m) + c
1000 = 10m + 620
380 = 10m
⇒ m = 38,
Hence, the function that represents the cost of clothing would be,
y = 38x + 620
If x = 6,
y = 38(6) + 620 = 848
Therefore, the cost of this family’s clothing in 1991 is $ 848.
