How to solve difficult algebra problem?

A College Bookstore has been selling one tee shirt for a year. During Fall term, 100 sold at $5 each. During Spring term, price raised to $7; consequently, 80 sold

a) Suppose number of tee shirts sold (N) depends linearly on price charged (x).Write equation showing this dependence. Identify and explain meaning of slope & vertical intercept. Then graph function

b) According to this relationship, how many tees would be sold during a term at $3.50 each? What should cost of a shirt be to sell 45 per term?

c) Suppose it costs Bookstore $3 per shirt

• Calculate profit during terms where they charge: $5,$6,$7,$8,$9,$10

• Use data to explain why profit doesn't depend linearly on price

• Explain why profit, P(x) depends quadratically on price

• Determine parameters a, b and c in quadratic model P(x)=ax^2+bx+c

d) Use different way to determine parameters a, b and c in quadratic model p(x)=ax^2+bx+c. Here is how: Generate formula describing how term profit (P) depends on price charged (x).HINT: PROFIT = (NUMBER SOLD) * (PROFIT PER SHIRT)

e) Draw graph of quadratic model, P(x).Use graph to find P-intercept; what does this point represent?

f) Calculate break-even points (price to charge in order to yield profit of $0).Explain meaning of each break-even point in context of situation

g) Now use graph to find price that will maximize Bookstore's profit.What will that profit be?

Thank you for any possible help!!

Comments

  • Let N=ax+b, where a, b are constants.

    (5,100)=>

    100=5a+b------(1)

    (7, 80)=>

    80=7a+b-------(2)

    From (1) & (2) get

    a=-10, b=150

    =>

    (a) N=-10x+150

    slope=-10=>

    for the increase of $1, there are

    reduction of 10 tee shirts in sale;

    the N-intercept=150 meaning that

    150 shirts will be "sold at no charge".

    (b) N(3.5)=-10(3.5)+150=115 sold.

    N=45=>x=(150-45)/10=$10.5/shirt

    (c) N=150-10x; let $C=the cost/shirt;

    the profit P=$(X-C)N

    | X |..5..|..6..|..7..|..8..|..9..|..10..|

    | C |-------------3---------------------|

    | N |100|.90.|.80.|.70.|.60.|.50...|

    | P |200|270|320|350|360|350..|

    By inspecting the data, P(x) does

    not linearly depend on x.

    By regression, get

    P(x)=-10x^2+180.0039x-449.9219 approximately

    [SSE=200.75, s^2=66.91666]

    =>a=-10, b=180, c=449.9219

    By solving equations, taking 3 points:

    (10,350), (8,350) & (6,270) from the table.

    P(x)=ax^2+bx+c

    =>

    100a+10b+c=350

    64a+8b+c=350

    36a+6b+c=270

    =>

    a=-10,b=180,c=-450

    =>

    p(x)=-10x^2+180x-450

    =>the profit depends quadratically on the charge x.

    p(0)=-450 meaning that the Bookstore will lose

    $450 totally in profit if it "sells" tee shirts at no charge.

    For maximizing P, let

    P'=-20x+180=0=>x=9

    P(9)=max. profit=$360

    => If the store sells tee shirt at $9 each, it will

    get a max.profit of $360 in total.

  • Points given are (5,100) and (7,80)

    Slope = -20/2 = -10

    Equation

    y-100 = -10(x-5)

    y = -10x+150

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