converges Antonyms
Strongest:
Strong:
Weak:
Strongest:
Strong:
- concenters
- cooperates
- collects
- collaborates
- congregates
- forgathers
- rendezvouses
- clusters
- gets-together
- foregathers
- joins
- concentrates
- conglomerates
- consolidates
- unites
Weak:
Meaning of converges
converges
to come together and unite in a common interest, to approach a limit as the number of terms increases without limit, to come together and unite in a common interest or focus, to tend or move toward one point or one another, to cause to converge
converges Sentence Examples
- The series converges to a finite limit as the number of terms approaches infinity.
- The sequence converges to the number e as the denominator tends to infinity.
- The geometric series converges if and only if the common ratio is less than 1 in absolute value.
- The integral converges if the function is bounded and the interval is finite.
- The improper integral converges absolutely if the sum of the absolute values of the terms converges.
- The Alternating Series Test can be used to determine if an alternating series converges conditionally.
- The Ratio Test can be used to determine if a series converges or diverges.
- The Root Test can be used to determine if a series converges or diverges.
- The Limit Comparison Test can be used to determine if a series converges or diverges.
- The Integral Test can be used to determine if a series converges or diverges.
FAQs About the word converges
to come together and unite in a common interest, to approach a limit as the number of terms increases without limit, to come together and unite in a common inte
convenes, merges,meets, gathers, assembles, concenters, cooperates, collects, collaborates, congregates
departs,disperses, splits (up), leaves, breaks up, dissociates, takes off,disbands,disjoins, disunites
The series converges to a finite limit as the number of terms approaches infinity.
The sequence converges to the number e as the denominator tends to infinity.
The geometric series converges if and only if the common ratio is less than 1 in absolute value.
The integral converges if the function is bounded and the interval is finite.