Examples of 'strictly increasing' in a sentence
Meaning of "strictly increasing"
strictly increasing - Strictly increasing refers to a sequence or set of values that are arranged in ascending order, with no repetition or decrease in values between consecutive elements. It is often used in mathematics and data analysis
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- always increasing, and never decreasing nor remaining constant; contrast this with monotonic increasing
How to use "strictly increasing" in a sentence
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strictly increasing
It is strictly increasing on its entire domain.
The v coordinates must be strictly increasing.
If f is strictly increasing and everywhere continuously.
A function with this property is called strictly increasing.
Is strictly increasing or strictly decreasing.
Prove an odd function is strictly increasing.
Be any strictly increasing function.
An isomorphism between linear orders is simply a strictly increasing bijection.
Then f is strictly increasing in a.
This is true because the natural logarithm is a strictly increasing function.
Then f is strictly increasing on.
It is apparent that the function is continuous and strictly increasing on and.
F is strictly increasing.
The uniqueness follows from the utility functions being strictly increasing.
Suppose ϕ is strictly increasing on.
See also
In set theory, a normal sequence is one that is continuous and strictly increasing.
Consider now the cases of a strictly increasing and strictly decreasing function.
This set of voltages to be applied to the columns forms a strictly increasing series.
Multifunctions that are either strictly increasing or strictly decreasing are called strictly monotonic.
The x-values of the points must be in strictly increasing order.
Suppose that is a strictly increasing sequence of positive integers such that the subsequences.
How many prime numbers contain strictly increasing digits?
No infinite, strictly increasing sequence of degrees has a least upper bound.
F is strictly monotone, if f is either strictly increasing or strictly decreasing.
Which is a strictly increasing and continuous function when t is non-negative real . Since.
It is known that the composition of two strictly increasing functions strictly increases.
If the inequality holds strictly, then the function is called strictly increasing.
CThe function should be strictly increasing on the interval.
Now we construct a one-to-one correspondence between A and B that is strictly increasing.
And for, is a strictly increasing function of.
These N+1 voltages Vi are chosen such that their values form a strictly increasing sequence.
For example, for a strictly increasing counter, the subtraction opcode is not used.
Thus for a limit ordinal α, there exists a δ-indexed strictly increasing sequence with limit α.
It is strictly increasing if an+1 > an for every n.
Therefore, f is strictly increasing.
Proof, Since f is either strictly increasing or strictly decreasing, it follows that f.
This value of the radiation characteristic ( R1 ) evolves according to a strictly increasing continuous function ( f4 ).
F ( n ) is a strictly increasing function.
For z = 0 and hence F is strictly increasing.
Hence, f is strictly increasing in.
For all, we have Taking, then is a strictly increasing function with, and.
Therefore, is strictly increasing on.
Of u ̄ and W is strictly increasing.
Therefore, f is strictly increasing on R.
Where h is any continuous, strictly increasing function with and.
If the graph has a single vertex and a strictly increasing slope, it is most likely a parabola.
Thus f ( x ) is strictly increasing.
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Examples of using Increasing
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An increasing number of preparations are being conducted on a regional basis
Surface temperatures are increasing around the world
Increasing the number of joint actions by sectors
Examples of using Strictly
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This place is run strictly by the book
This is strictly whatever the opposite of platonic is
Long enough if we keep strictly to our timetable
