CORPORATE FRAUD The number of pending corporate fraud cases stood at 545 at the beginning of 2008 ( t = 0 ) and was 726 at the beginning of 2012 . The growth was approximately linear. a. Derive an equation of the line passing through the points A ( 0 , 545 ) and B ( 4 , 726 ) . b. Plot the line with the equation found in part ( a ) . c. Use the equation found in part ( a ) to estimate the number of pending corporate fraud cases at the beginning of 2014 . Source : Federal Bureau of Investigation.
CORPORATE FRAUD The number of pending corporate fraud cases stood at 545 at the beginning of 2008 ( t = 0 ) and was 726 at the beginning of 2012 . The growth was approximately linear. a. Derive an equation of the line passing through the points A ( 0 , 545 ) and B ( 4 , 726 ) . b. Plot the line with the equation found in part ( a ) . c. Use the equation found in part ( a ) to estimate the number of pending corporate fraud cases at the beginning of 2014 . Source : Federal Bureau of Investigation.
Solution Summary: The author explains how the equation of line passing through the given points is y=1814x+545.
CORPORATE FRAUD The number of pending corporate fraud cases stood at
545
at the beginning of
2008
(
t
=
0
)
and was
726
at the beginning of
2012
. The growth was approximately linear.
a. Derive an equation of the line passing through the points
A
(
0
,
545
)
and
B
(
4
,
726
)
.
b. Plot the line with the equation found in part
(
a
)
.
c. Use the equation found in part
(
a
)
to estimate the number of pending corporate fraud cases at the beginning of
2014
.
Q1: A: Let M and N be two subspace of finite dimension linear space X, show that if M = N
then dim M = dim N but the converse need not to be true.
B: Let A and B two balanced subsets of a linear space X, show that whether An B and
AUB are balanced sets or nor.
Q2: Answer only two
A:Let M be a subset of a linear space X, show that M is a hyperplane of X iff there exists
ƒ€ X'/{0} and a € F such that M = (x = x/f&x) = x}.
fe
B:Show that every two norms on finite dimension linear space are equivalent
C: Let f be a linear function from a normed space X in to a normed space Y, show that
continuous at x, E X iff for any sequence (x) in X converge to Xo then the sequence
(f(x)) converge to (f(x)) in Y.
Q3: A:Let M be a closed subspace of a normed space X, constract a linear space X/M as
normed space
B: Let A be a finite dimension subspace of a Banach space X, show that A is closed.
C: Show that every finite dimension normed space is Banach space.
pls help
Chapter 1 Solutions
Finite Mathematics For The Managerial, Life, And Social Sciences
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