Cash in on Neighbors
Neighbors can be a nuisance sometimes. They're always calling for help, or borrowing weird tools that you don't need and never return, or wearing their pants too high. But there are also benefits to having good neighbors — they may come in handy as a sounding board for ideas, as a babysitter on short notice, or just someone to share the occasional bottle of wine with.
This article is going to give you some tips on how you can capitalize on your neighbors while minimizing the downsides!
#5+5=11 words
The number 11 is not one of the numbers 1-10 because it cannot be written as a single digit number. However, the number 11 is a prime number and is not divisible by either 1 or itself so 11 is a unique number.
However, if we use the new definition of "11", where 2 and 3 are added to 5 and 5 respectively, then we can see that 11 is defined as follows:
1 + 1 + 1 = 3 5 + 5 = 10 -------------------------- 5 + 5 = 11
That means that using this new definition of eleven, eleven must be divisible by one (1) and be divisible by itself (11). That makes eleven a composite number. In other words, the new definition of eleven results in a contradiction. 11 cannot be both prime and composite at the same time.
As an aside, it is not easy to find a simple contradiction like this that is less than 100 words.
____________
A man went to the doctor. He complained of having a dull ache at the base of his spine. His doctor walked around him and suddenly kicked the man in his buttocks and said, "There, that should fix your back." _______________________
1.What is the value of x?
2.Find k if (x - 14)2 = 3k(x + 2).
3.An explorer wants to walk from point A to point B which are 25 meters apart on an island he cannot see from where he stands. Assuming that he starts walking at the same location and knows his walking speed, how long would it take him to walk the distance? Round your answer to the nearest whole number of minutes.
4.A seesaw is balanced when each side is in equilibrium. An object is moved along pins placed equidistant from the center, and each time a pin is removed by one of its supports, the other pin will be closer to the center than before. If one side was in equilibrium with itself, then why does it move towards its imaginary axis when one support is removed?
5. There are six coins on the floor numbered 1-6. You take away five coins and then return two of the remaining coins. What is the minimum number of coins needed to repeat this process 10 times?
6. Find x, if (2x + 4)2 = 132
7.What is the value of y if x is 5 less than three y's?
8. Six people went out to dinner, and each person ordered a different meal: hamburger, fish, salad, tofu steak, pizza, or spaghetti. If they all paid $11 for their meal and there was $9 left over because one person paid $10 in cash, who ordered what meal?
1.a)If n is a prime number, then it can be written in one of these ways:
n = 1 x 2 x 3 ... x n-1 if n is even
n = (1/2) x 2 x 3 ... x (n-1) + 1 if n is odd
From the definition of rational numbers:
If p and q are integers, then p/q can be written as a fraction where the numerator p and the denominator q are relatively prime. So, if p and q are relatively prime then they can never be divisible by any common divisor (and hence they need not have any common divisor). This means that p/q is an integer.
If p and q are relatively prime, then p/q can be written as a fraction where the numerator and denominator are relatively prime. So, if p and q are relatively prime then they can never have a common divisor. This means that p/q is a rational number.
In the decimal system, there is such a thing as the unit (1) root (i.e., 1). In integer arithmetic this root always exists and is unique: if n is an integer, then n = n + 1. In algebraic expressions, the unit root (1) is always present and unique, but it does not cause any problems.
In integer arithmetic there is a "zero root" of all polynomials. This zero root is the empty sum of a finite number of monomials, i.e., 1. There are also infinitely many roots that are not zero which have no physical significance: they can be used to generate all possible polynomials (which have their own roots).
There are infinitely many roots that are equal to 0. These roots can be used to generate all possible integers (which have their own roots).
Conclusion: there is a zero root and infinitely many non-zero roots of all polynomials of degree less or equal to the degree of the root of the polynomial.
We will assume that we have computed two values "a" and "b". The question is whether or not this proves that either:
All integers less than 1 are expressible by using squaring. For example, we can put numbers between 0 and 1 into an equation as follows:
"a" + "b" = 2
All integers formula_13 whose square is a prime number.
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Cash in on Neighbors