which one smaller √3 or 1/√3 ?
Answers
Step-by-step explanation:
relationship √2+√3≈π 2+3≈π is acoincidence and has no significance even though neat polygons can be drawn around circles to demonstrate this relationship.
Given any arbitrary constant between zero and ten, I suspect you can get quite close to that constant with a small number of small integers and a few basic arithmetic operators. The number of permutations of just the ten digits with say half a dozen operators with up to seven symbols in total would be more than
167=268,435,456 167=268,435,456
Commutativity and associativity of operators would significantly reduce the total number of values that could be generated, but just a million of them would, on average, mean that one of these expressions could approximate your arbitrary constant to five decimal places! (Note that the decimal expansion of the number might be just such an expression, but let's ignore that triviality.)
In the light of this it is no surprise that π π can be approximated to two decimal places with a simple looking expression involving two digits and three operators.
Having said that, I do not promise to give you a simple expression for your favourite (φ=1.61803… φ=1.61803… ), (e=2.71828… e=2.71828… ), (λ=1.30357… λ=1.30357… ), or whatever.
Brought to you by the Campaign to Demystify π π : there is nothing mystical about π π .
Answer:
1/√3 is smaller
because, value of √3 = 1.732
value of 1/√3=0.577
hope this helps you ☺️