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sin(y) - y = x√(2) solve for y

at which angle does the graph y=sin(1/x) cross the y-axis??

That's great. Thanks!

The pattern above will continue for all values of the harmonic sequence. Will a destination point be reached for any value of θ where 0 ≤ θ < 2𝜋? (I know it won’t for θ = 0) Is there a function which contains the set of all destination points?

Thanks

Interesting

y = x2

Path g(x) is a function which contains all points that are at a constant distance from f(x). What is g(x) in terms of f(x)?

In the following equation: $$g'(x) = f'\left( x + \frac{c f'(x)}{\sqrt{ 1 + f'(x)^2 }} \right)$$ find $g(x)$ with respect to $f(x)$ where $c$ is any constant.