Welcome to Anagrammer Crossword Genius! Keep reading below to see if increases is an answer to any crossword puzzle or word game (Scrabble, Words With Friends etc). Scroll down to see all the info we have compiled on increases.
increases
Searching in Crosswords ...
The answer INCREASES has 28 possible clue(s) in existing crosswords.
Searching in Word Games ...
The word INCREASES is VALID in some board games. Check INCREASES in word games in Scrabble, Words With Friends, see scores, anagrams etc.
Searching in Dictionaries ...
Definitions of increases in various dictionaries:
noun - a quantity that is added
noun - a change resulting in an increase
noun - a process of becoming larger or longer or more numerous or more important
Word Research / Anagrams and more ...
Keep reading for additional results and analysis below.
| Possible Dictionary Clues |
|---|
| Plural form of increase. |
| Third-person singular simple present indicative form of increase. |
| Become or make greater in size, amount, or degree. |
| A rise in the size, amount, or degree of something. |
| become or make greater in size, amount, or degree. |
| a rise in the size, amount, or degree of something. |
| Increases might refer to |
|---|
| Exponential growth is exhibited when the rate of change—the change per instant or unit of time—of the value of a mathematical function is proportional to the function's current value, resulting in its value at any time being an exponential function of time, i.e., a function in which the time value is the exponent. * Exponential decay occurs in the same way when the growth rate is negative. In the case of a discrete domain of definition with equal intervals, it is also called geometric growth or geometric decay, the function values forming a geometric progression. In either exponential growth or exponential decay, the ratio of the rate of change of the quantity to its current size remains constant over time. * The formula for exponential growth of a variable x at the growth rate r, as time t goes on in discrete intervals (that is, at integer times 0, 1, 2, 3, ...), is* * * * * x * * t * * * = * * x * * 0 * * * ( * 1 * + * r * * ) * * t * * * * * {\displaystyle x_{t}=x_{0}(1+r)^{t}} * where x0 is the value of x at time 0. This formula is transparent when the exponents are converted to multiplication. For instance, with a starting value of 50 and a growth rate of r = 5% = 0.05 per interval, the passage of one interval would give 50 × 1.051 = 50 × 1.05; two intervals would give 50 × 1.052 = 50 × 1.05 × 1.05; and three intervals would give 50 × 1.053 = 50 × 1.05 × 1.05 × 1.05. In this way, each increase in the exponent by a full interval can be seen to increase the previous total by another five percent. (The order of multiplication does not change the result based on the associative property of multiplication.) * Since the time variable, which is the input to this function, occurs as the exponent, this is an exponential function. This contrasts with growth based on a power function, where the time variable is the base value raised to a fixed exponent, such as cubic growth. |