The yearly salary for job A is $60,000 initially with an annual raise of $ 3000 every year thereafter. The yearly salary for job B is 556 , 000 for year 1 with an annual raise of 6 % . a. Consider a sequence representing the salary for job A for year n . Is this an arithmetic or geometric sequence? Find the total earnings for job A over 20 yr . b. Consider a sequence representing the salary for job B for year n . Is this an arithmetic or geometric sequence? Find the total earnings for job B over 20 yr . Round to the nearest dollar, c. What is the difference in total salary between the two jobs over 20 yr ?
The yearly salary for job A is $60,000 initially with an annual raise of $ 3000 every year thereafter. The yearly salary for job B is 556 , 000 for year 1 with an annual raise of 6 % . a. Consider a sequence representing the salary for job A for year n . Is this an arithmetic or geometric sequence? Find the total earnings for job A over 20 yr . b. Consider a sequence representing the salary for job B for year n . Is this an arithmetic or geometric sequence? Find the total earnings for job B over 20 yr . Round to the nearest dollar, c. What is the difference in total salary between the two jobs over 20 yr ?
The yearly salary for job
A
is $60,000 initially with an annual raise of
$
3000
every year thereafter. The yearly salary for job
B
is
556
,
000
for year
1
with an annual raise of
6
%
.
a. Consider a sequence representing the salary for job
A
for year
n
. Is this an arithmetic or geometric sequence? Find the total earnings for job
A
over
20
yr
.
b. Consider a sequence representing the salary for job
B
for year
n
. Is this an arithmetic or geometric sequence? Find the total earnings for job
B
over
20
yr
. Round to the nearest dollar,
c. What is the difference in total salary between the two jobs over
20
yr
?
Find a plane containing the point (3, -3, 1) and the line of intersection of the planes 2x + 3y - 3z = 14
and -3x - y + z = −21.
The equation of the plane is:
Determine whether the lines
L₁ : F(t) = (−2, 3, −1)t + (0,2,-3) and
L2 : ƒ(s) = (2, −3, 1)s + (−10, 17, -8)
intersect. If they do, find the point of intersection.
● They intersect at the point
They are skew lines
They are parallel or equal
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