function is defined over (0,6) by
f(x)={14x00<xandx≤33<xandx<6.
We then extend it to an odd periodic function of period 12
and its graph is displayed below.
calculate b1,b2,b3,b4, Thanks so much
Homework Answers
The solution to the above problem is given below. Please review the answer and let me know if you have any doubts.
Add Answer to:
function is defined over (0,6) by
f(x)={14x00<xandx≤33<xandx<6.
We then extend it to an odd periodic function of...
A function is defined over (0,6) by 0 <and I <3 f(1) = - { 3<;...
A function is defined over (0,6) by 0 <and I <3 f(1) = - { 3<; and <6 We then extend it to an odd periodic function of period 12 and its graph is displayed below. N y 1 0 -10 5 5 10 15 X The function may be approximated by the Fourier series f (t) = a0 + 1 (an cos (021 ) + bn sin ( 122 )), where L is the half-period of the function. Use...
0 3 and z s 6 We then extend it to an odd periodic function of period 12 and its graph is display...
0 3 and z s 6 We then extend it to an odd periodic function of period 12 and its graph is displayed below 2 y 1 -105 5 10 15 2 The function may be approximated by the Fourier series where L is the half-period of the function Use the fact that J(e) and fe)cL) are odd functions, enter the value of en in the box below f(z) cos an 0 for n 0,1,2,... Hence the Fourier series made...
A function is defined over (0,3) by f(3) = 12 +1. We then extend it to...
A function is defined over (0,3) by f(3) = 12 +1. We then extend it to an even periodic function of period 6 and its graph is displayed below. 2 15 0.5 5 10 15 х -0.5 The function may be approximated by the Fourier series f () = ap + 01 (an cos ( 122 ) + bn sin (022)). where L is the half-period of the function. Use the fact that f(x) sin is an odd functions, enter...
Given the periodic function 5 f(1) = { 1 f (+4) 0<i and I<2 2 <r...
Given the periodic function 5 f(1) = { 1 f (+4) 0<i and I<2 2 <r and I<4 otherwise and its graph is displayed below. 6 5 4 y 3 2 1 0 -2 2 4 6 00+ x The function may be approximated by the Fourier series f(t) = 40 + 1 (an cos ( 172 ) + bn sin where L is the half-period of the function. + bn sin ne :)), L Calculate the coefficients of the...
Question 6 Consider the function defined over the interval 0<x<L. Extend f(x) as a function of...
Question 6 Consider the function defined over the interval 0<x<L. Extend f(x) as a function of period 2L by using an odd half-range expansion 1) Sketch the extended function over the interval -3L<XS3L. 2) Calculate the coefficients for the Fourier Series representation of the extended function. 3) Write the first 5 non-zero terms of the Fourier Series. (10 marks)
Fourier Series for Odd Functions Recall that if f is an odd function, f(-x)f(x). An odd Fourier series has only the...
Fourier Series for Odd Functions Recall that if f is an odd function, f(-x)f(x). An odd Fourier series has only the sine terms, and can be approximate an odd function, so Fo(x) b sinx)+b2 sin(2x)+ b, sin(3x)+. Why is there no b, term in the series F, (x)? 1. 2. Using steps similar to those outlined for even functions, develop a rule for finding the coefficients to approximate any odd function on the interval [-π, π]. 3. If f (x)sin...
Let be a function defined by: We define by extension the odd, periodic function of period...
Let be a function defined by:
We define by extension the odd, periodic function of period p = 2
which coincides with the function f (x) on the interval [0, 1].
Draw over the interval [−1, 3] the graph of the function towards
which the Fourier series of the odd continuation of the function f
(x) converges.
f(x) = 1 + x2 pour 0 < x < 1.
y=f(x)y=f(x) is the function illustrated below, defined only on x∈[0,6]x∈[0,6]: Complete the Fourier Coefficients? An is...
y=f(x)y=f(x) is the function
illustrated below, defined only on x∈[0,6]x∈[0,6]:
Complete the Fourier Coefficients? An is incorrect.
At least one of the answers above is NOT correct. 13 of the questions remain unanswered. (1 point) yf(z is the function illustrated below, defined only on E0,6 1.e 51 Compute the Fourier coefficlents for f(x) Now compute the cosine coefficients: An f)cos ()dz dr XCos(npix/6) -( d 0 Note: You can earn partial credit on this problem. Submit Answers Preview My Answers...
Consider the periodic function defined by 1<t0, 0<t<1, f(t)= f(t+2) f(), and its Fourier series F(t): Σ A,...
Consider the periodic function defined by 1<t0, 0<t<1, f(t)= f(t+2) f(), and its Fourier series F(t): Σ A, cos(nmi) +ΣB, sin (nπί), F(t)= Ao+ n1 n=1 (a) Sketch the function f(t) the function is even, odd or neither even nor odd. over the range -3<t< 3 and hence state whether (b) Calculate the constant term Ao
Consider the periodic function defined by 1
f(x)=\x(-2<x<2), p = 4 for the given periodic function, what the Fourier series of f? a....
f(x)=\x(-2<x<2), p = 4 for the given periodic function, what the Fourier series of f? a. an= 8 -cos(nm) 22 n' bn=0 Ob. 4 an = -COS(nn) n?? 4 bn= n2012 C. an 4 cos(nn) n272 bn=0 O d. an 4 22 [(-1)" – 1] bn=0 e. an= 4. -sin(n) n' 2 bn=0
A function is defined over (0,6) by 0 <and I <3 f(1) = - { 3<; and <6 We then extend it to an odd periodic function of period 12 and its graph is displayed below. N y 1 0 -10 5 5 10 15 X The function may be approximated by the Fourier series f (t) = a0 + 1 (an cos (021 ) + bn sin ( 122 )), where L is the half-period of the function. Use...
0 3 and z s 6 We then extend it to an odd periodic function of period 12 and its graph is displayed below 2 y 1 -105 5 10 15 2 The function may be approximated by the Fourier series where L is the half-period of the function Use the fact that J(e) and fe)cL) are odd functions, enter the value of en in the box below f(z) cos an 0 for n 0,1,2,... Hence the Fourier series made...
A function is defined over (0,3) by f(3) = 12 +1. We then extend it to an even periodic function of period 6 and its graph is displayed below. 2 15 0.5 5 10 15 х -0.5 The function may be approximated by the Fourier series f () = ap + 01 (an cos ( 122 ) + bn sin (022)). where L is the half-period of the function. Use the fact that f(x) sin is an odd functions, enter...
Given the periodic function 5 f(1) = { 1 f (+4) 0<i and I<2 2 <r and I<4 otherwise and its graph is displayed below. 6 5 4 y 3 2 1 0 -2 2 4 6 00+ x The function may be approximated by the Fourier series f(t) = 40 + 1 (an cos ( 172 ) + bn sin where L is the half-period of the function. + bn sin ne :)), L Calculate the coefficients of the...
Question 6 Consider the function defined over the interval 0<x<L. Extend f(x) as a function of period 2L by using an odd half-range expansion 1) Sketch the extended function over the interval -3L<XS3L. 2) Calculate the coefficients for the Fourier Series representation of the extended function. 3) Write the first 5 non-zero terms of the Fourier Series. (10 marks)
Fourier Series for Odd Functions Recall that if f is an odd function, f(-x)f(x). An odd Fourier series has only the sine terms, and can be approximate an odd function, so Fo(x) b sinx)+b2 sin(2x)+ b, sin(3x)+. Why is there no b, term in the series F, (x)? 1. 2. Using steps similar to those outlined for even functions, develop a rule for finding the coefficients to approximate any odd function on the interval [-π, π]. 3. If f (x)sin...
Let be a function defined by:
We define by extension the odd, periodic function of period p = 2
which coincides with the function f (x) on the interval [0, 1].
Draw over the interval [−1, 3] the graph of the function towards
which the Fourier series of the odd continuation of the function f
(x) converges.
f(x) = 1 + x2 pour 0 < x < 1.
y=f(x)y=f(x) is the function
illustrated below, defined only on x∈[0,6]x∈[0,6]:
Complete the Fourier Coefficients? An is incorrect.
At least one of the answers above is NOT correct. 13 of the questions remain unanswered. (1 point) yf(z is the function illustrated below, defined only on E0,6 1.e 51 Compute the Fourier coefficlents for f(x) Now compute the cosine coefficients: An f)cos ()dz dr XCos(npix/6) -( d 0 Note: You can earn partial credit on this problem. Submit Answers Preview My Answers...
Consider the periodic function defined by 1<t0, 0<t<1, f(t)= f(t+2) f(), and its Fourier series F(t): Σ A, cos(nmi) +ΣB, sin (nπί), F(t)= Ao+ n1 n=1 (a) Sketch the function f(t) the function is even, odd or neither even nor odd. over the range -3<t< 3 and hence state whether (b) Calculate the constant term Ao
Consider the periodic function defined by 1
f(x)=\x(-2<x<2), p = 4 for the given periodic function, what the Fourier series of f? a. an= 8 -cos(nm) 22 n' bn=0 Ob. 4 an = -COS(nn) n?? 4 bn= n2012 C. an 4 cos(nn) n272 bn=0 O d. an 4 22 [(-1)" – 1] bn=0 e. an= 4. -sin(n) n' 2 bn=0
Most questions answered within 3 hours.
-
A futuristic design for a car is to have a large solid
disk-shaped flywheel within the...
asked 4 minutes ago -
Discuss how Entrepreneurial leadership style differs
from traditional leadership?
asked 6 minutes ago -
Solid NaOH is added to a solution of 0.50 M acetic acid until
the pH of...
asked 7 minutes ago -
Which of the following statements is not a characteristic of the
Internal Revenue Code?
A) The...
asked 15 minutes ago -
Say true or false and explain it.
A heap is represented using an array. The array...
asked 25 minutes ago -
Explain how the DNA replication enzyme complex is organized and
functions, please don't copy paste from...
asked 24 minutes ago -
how
can personality contribute to one scoring high on the need to
evaluate measurement by Jarvis?
asked 26 minutes ago -
A high jumper is attempting to jump over a crossbar that is
placed at a height...
asked 30 minutes ago -
1.
A hemophiliac male mates with a healthy female. what are the
possible genotypes for the...
asked 47 minutes ago -
You could argue that even though Rockefeller clearly had
enormous market power (90% of the market)...
asked 1 hour ago -
At the beginning of the year, Palermo Brothers, Inc., purchased
a new plastic water bottle making...
asked 1 hour ago -
Calculate the change in the Gibbs energy of the system for the
following processes: a) 6.0...
asked 51 minutes ago