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0 0 cau2-1y evaluated at x2 m 00 BAIRY" evaluated at x [-1,1] 4. [2/5 Points] DETAILS PREVIOUS ANSWERS 3/6 Submissions Used Previous Answers Submission 1 (1/5 points) Let f(x)=lxl.-1 SxS 1. Then there is a Fourier-Legendre expansion f(x)= m Pon(x) where ino Com 1 and for all m2 2 1 Cm mlm X where k=m X Submission 2 (2/5 points) Let fox)brl.-1 ss 1. Then there is a Fourier-Legendre expansion fx)= cm Parlx) where m0 1 2 4-0 and for all m2 2 1 Cm m! 2+1 -1" evaluated at x= 2m X x where km - 1 Submission 3 (2/5 points) Let f(x)=ixi.-1sxs 1. Then there is a Fourier-Legendre expansion f(. f(x)m P(x) where -O 1 Co" 2 C=0 and for all m2 2 1 (2m+1) + Your answer m! 2mm X x Information where COP kem! X New Randomization Let f(x)=\xl.-1 sxs 1. Then there is a Fourier-Legendre expansion FIX)= Cm P(x) where Co" 1 2 9-10 and for all m 2 1 Cm- 2m +1 2+1 (4217" evaluated at x= 1 where Submit Answer Viewing Saved Work Revert to Last Response View Previous Question Question 4 of 4 0 0 cau2-1y evaluated at x2 m 00 BAIRY" evaluated at x [-1,1] 4. [2/5 Points] DETAILS PREVIOUS ANSWERS 3/6 Submissions Used Previous Answers Submission 1 (1/5 points) Let f(x)=lxl.-1 SxS 1. Then there is a Fourier-Legendre expansion f(x)= m Pon(x) where ino Com 1 and for all m2 2 1 Cm mlm X where k=m X Submission 2 (2/5 points) Let fox)brl.-1 ss 1. Then there is a Fourier-Legendre expansion fx)= cm Parlx) where m0 1 2 4-0 and for all m2 2 1 Cm m! 2+1 -1" evaluated at x= 2m X x where km - 1 Submission 3 (2/5 points) Let f(x)=ixi.-1sxs 1. Then there is a Fourier-Legendre expansion f(. f(x)m P(x) where -O 1 Co" 2 C=0 and for all m2 2 1 (2m+1) + Your answer m! 2mm X x Information where COP kem! X New Randomization Let f(x)=\xl.-1 sxs 1. Then there is a Fourier-Legendre expansion FIX)= Cm P(x) where Co" 1 2 9-10 and for all m 2 1 Cm- 2m +1 2+1 (4217" evaluated at x= 1 where Submit Answer Viewing Saved Work Revert to Last Response View Previous Question Question 4 of 4