Break-even analysis. Use the revenue function from Problem 69 and the given cost function: R x = x 75 − 3 x Revenue function C x = 125 + 16 x C o s t function where x is in millions of chips, and R x and C x are in millions of dollars. Both functions have domain 1 ≤ x ≤ 20 . (A) Sketch a graph of both functions in the same rectangular coordinate system . (B) Find the break-even points to the nearest thousand chips. (C) For what values of x will a loss occur? A profit?
Break-even analysis. Use the revenue function from Problem 69 and the given cost function: R x = x 75 − 3 x Revenue function C x = 125 + 16 x C o s t function where x is in millions of chips, and R x and C x are in millions of dollars. Both functions have domain 1 ≤ x ≤ 20 . (A) Sketch a graph of both functions in the same rectangular coordinate system . (B) Find the break-even points to the nearest thousand chips. (C) For what values of x will a loss occur? A profit?
Break-even analysis. Use the revenue function from Problem
69
and the given cost function:
R
x
=
x
75
−
3
x
Revenue function
C
x
=
125
+
16
x
C
o
s
t
function
where
x
is in millions of chips, and
R
x
and
C
x
are in millions of dollars. Both functions have domain
1
≤
x
≤
20
.
(A) Sketch a graph of both functions in the same rectangular coordinate system.
(B) Find the break-even points to the nearest thousand chips.
(C) For what values of
x
will a loss occur? A profit?
Formula Formula A polynomial with degree 2 is called a quadratic polynomial. A quadratic equation can be simplified to the standard form: ax² + bx + c = 0 Where, a ≠ 0. A, b, c are coefficients. c is also called "constant". 'x' is the unknown quantity
Give an example of a graph with at least 3 vertices that has exactly 2 automorphisms(one of which is necessarily the identity automorphism). Prove that your example iscorrect.
3. [10 marks]
Let Go (Vo, Eo) and G₁
=
(V1, E1) be two graphs that
⚫ have at least 2 vertices each,
⚫are disjoint (i.e., Von V₁ = 0),
⚫ and are both Eulerian.
Consider connecting Go and G₁ by adding a set of new edges F, where each new edge
has one end in Vo and the other end in V₁.
(a) Is it possible to add a set of edges F of the form (x, y) with x € Vo and y = V₁ so
that the resulting graph (VUV₁, Eo UE₁ UF) is Eulerian?
(b) If so, what is the size of the smallest possible F?
Prove that your answers are correct.
Let T be a tree. Prove that if T has a vertex of degree k, then T has at least k leaves.
Chapter 2 Solutions
Finite Mathematics for Business, Economics, Life Sciences and Social Sciences
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