For a function, the norm of the function is defined as [...]
Answer
the square root of the inner product of the function: \(||f(x)||:=\sqrt{\left\langle f(x),f(x)\right\rangle}=\sqrt{\int^{x=b}_{x=a}|f(x)|^{2}dx}\)
Question
For a function, the norm of the function is defined as [...]
Answer
?
Question
For a function, the norm of the function is defined as [...]
Answer
the square root of the inner product of the function: \(||f(x)||:=\sqrt{\left\langle f(x),f(x)\right\rangle}=\sqrt{\int^{x=b}_{x=a}|f(x)|^{2}dx}\)
If you want to change selection, open document below and click on "Move attachment"
Definition of the norm of the function For a function, the norm of the function is defined as the square root of the inner product of the function: \(||f(x)||:=\sqrt{\left\langle f(x),f(x)\right\rangle}=\sqrt{\int^{x=b}_{x=a}|f(x)|^{2}dx}\)
Summary
status
not learned
measured difficulty
37% [default]
last interval [days]
repetition number in this series
0
memorised on
scheduled repetition
scheduled repetition interval
last repetition or drill
Details
No repetitions
Discussion
Do you want to join discussion? Click here to log in or create user.