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Question
All the strictly increasing function are monotonically increasing functions.
All the strictly increasing function are monotonically increasing functions.
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Solution
The correct option is A True
We know that Strictly increasing functions are the functions which increases on increasing the values of x. Whereas in a monotonically increasing function, the function does not decrease its value as we increase x. This implies the function can remaining constant when we increase x. If a function remains constant, it can’t be a strictly increasing function, but it can be a monotonically increasing or increasing function.
So, all strictly increasing functions are monotonically increasing, because they never decrease.
True
We know that Strictly increasing functions are the functions which increases on increasing the values of x. Whereas in a monotonically increasing function, the function does not decrease its value as we increase x. This implies the function can remaining constant when we increase x. If a function remains constant, it can’t be a strictly increasing function, but it can be a monotonically increasing or increasing function.
So, all strictly increasing functions are monotonically increasing, because they never decrease.
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