Where does Tan equal 3?
Where does Tan equal 3?
Important Angles: 30°, 45° and 60°
| Angle | Tan=Sin/Cos |
|---|---|
| 30° | 1 √3 = √3 3 |
| 45° | 1 |
| 60° | √3 |
Which of the following is a solution to TANX <UNK> 3 0?
Therefore, the general solution of equation tan x – √3 = 0 are the infinite sets of values of x given in (i) and (ii). Hence general solution of tan x – √3 = 0 is x = nπ + π3, n ∈ I.
How do you find minimum and maximum values in trigonometry?
Ratta-fication formulas
- a sin θ ± b cos θ = ±√ (a2 + b2 ) { for min. use – , for max. use + }
- a sin θ ± b sin θ = ±√ (a2 + b2 ) { for min. use – , for max. use + }
- a cos θ ± b cos θ = ±√ (a2 + b2 ) { for min. use – , for max. use + }
- Min. value of (sin θ cos θ)n = (½)n
Is Arctan convergent or divergent?
For arctan1x, as x gets bigger, this series slowly starts to become the harmonic series, which diverges.
What’s bigger than infinity times infinity?
With this definition, there is nothing (meaning: no real numbers) larger than infinity. There is another way to look at this question. It come from an idea of Georg Cantor who lived from 1845 to 1918. Cantor looked at comparing the size of two sets, that is two collections of things.
What is bigger infinity 1 or infinity?
Usually,if infinity is used like that, every number is assumed smaller than infinity, infinity is assumed equal to infinity and any number + infinity is defined equal to infinity +(x,infinity)=infinity for every real x. In that case: no, infinity +1 is not bigger than infinity.
Is Omega more than infinity?
ABSOLUTE INFINITY !!! This is the smallest ordinal number after “omega”. Informally we can think of this as infinity plus one. In order to say omega and one is “larger” than “omega” we define largeness to mean that one ordinal is larger than another if the smaller ordinal is included in the set of the larger.