Can There Be More Than One Global Maximum at Lorelei Rios blog

Can There Be More Than One Global Maximum. Firstly, a global maximum is unique within the entire domain of the function, meaning there can only be one global maximum value. There is only one global. The definition does not suggest that. The maximum or minimum over the entire function is called an absolute or global maximum or minimum. My question is can there be more than one global maximum(or minimum) of a function? For example the global maximum of sin(x) is 1. Global extrema are the largest and smallest values that a function takes on over its entire domain, and local extrema are extrema which. A more extreme example is $y=16$, which has the same global maximum. And in that sense no, there can't be more than one global maximum. But it's clear from your picture that you're asking whether the global. Make a list of all local extrema and boundary points, then pick the largest. Global maxima or minima do not need. You can attain it at more than one point, as you do here.

What is the definition of a local maximum or minimum? Can there be more
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My question is can there be more than one global maximum(or minimum) of a function? Global extrema are the largest and smallest values that a function takes on over its entire domain, and local extrema are extrema which. A more extreme example is $y=16$, which has the same global maximum. For example the global maximum of sin(x) is 1. Firstly, a global maximum is unique within the entire domain of the function, meaning there can only be one global maximum value. The maximum or minimum over the entire function is called an absolute or global maximum or minimum. You can attain it at more than one point, as you do here. But it's clear from your picture that you're asking whether the global. And in that sense no, there can't be more than one global maximum. Make a list of all local extrema and boundary points, then pick the largest.

What is the definition of a local maximum or minimum? Can there be more

Can There Be More Than One Global Maximum My question is can there be more than one global maximum(or minimum) of a function? For example the global maximum of sin(x) is 1. Firstly, a global maximum is unique within the entire domain of the function, meaning there can only be one global maximum value. Make a list of all local extrema and boundary points, then pick the largest. There is only one global. And in that sense no, there can't be more than one global maximum. My question is can there be more than one global maximum(or minimum) of a function? Global extrema are the largest and smallest values that a function takes on over its entire domain, and local extrema are extrema which. The definition does not suggest that. Global maxima or minima do not need. But it's clear from your picture that you're asking whether the global. The maximum or minimum over the entire function is called an absolute or global maximum or minimum. A more extreme example is $y=16$, which has the same global maximum. You can attain it at more than one point, as you do here.

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