Boiling point. The temperature at which water starts to boil is also linearly related to barometric pressure. Water boils at 212 ° F at a pressure of 29.9 inHg (inches of mercury) and at 191 ° F at a pressure of 28.4 inHg. (A) Find a relationship of the form T = m x + b , where T is degrees Fahrenheit and x is pressure in inches of mercury. (B) Find the boiling point at a pressure of 31 inHg. (C) Find the pressure if the boiling point is 199 ° F . (D) Graph T and illustrate the answers to (B) and (C) on the graph.
Boiling point. The temperature at which water starts to boil is also linearly related to barometric pressure. Water boils at 212 ° F at a pressure of 29.9 inHg (inches of mercury) and at 191 ° F at a pressure of 28.4 inHg. (A) Find a relationship of the form T = m x + b , where T is degrees Fahrenheit and x is pressure in inches of mercury. (B) Find the boiling point at a pressure of 31 inHg. (C) Find the pressure if the boiling point is 199 ° F . (D) Graph T and illustrate the answers to (B) and (C) on the graph.
Boiling point. The temperature at which water starts to boil is also linearly related to barometric pressure. Water boils at
212
°
F
at a pressure of 29.9 inHg (inches of mercury) and at
191
°
F
at a pressure of 28.4 inHg.
(A) Find a relationship of the form
T
=
m
x
+
b
,
where
T
is degrees Fahrenheit and
x
is
pressure in inches of mercury.
(B) Find the boiling point at a pressure of 31 inHg.
(C) Find the pressure if the boiling point is
199
°
F
.
(D) Graph
T
and illustrate the answers to (B) and (C) on the graph.
Only 100% sure experts solve it correct complete solutions ok
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.
Chapter 1 Solutions
Finite Mathematics for Business, Economics, Life Sciences, and Social Sciences (14th Edition)
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