Does anybody know aboout the new law for Volvo 850 ABS and TRAC lights?
The state of NH came out with a new law this year requiring the ABS and TRAC dashboard lights to be off. I had the inspection done at an independent mechanic. The car passes inpection except for the ABS and TRAC lights. I went to Volvo and they didn't even know about the new law yet. However, they looked it up and found it in the new book. They quoted $720 for a new computer module and labor. My question is, how can I get around this? Even they said it was a silly law and that the brakes work irregardless. I wouldn't sacrifice safety, but I've been driving under this condition for years. Any ideas? Thanks.
What is the well-ordering principle?
The well-ordering principle is a concept which is equivalent to mathematical induction.THEOREM [The well-ordering principle]: Every non-empty subset of the natural numbers has a least element.PROOF: Let A be a non-empty subset of N. We wish to show that A has a least element, that is, that there is an element a ∈ A such that a ≤ n for all n ∈ A.We will do this by strong induction on the following predicate: P(n) : “If n ∈ A, then A has a least element.”Basic Step: P(0) is clearly true, since 0 ≤ n for all n ∈ N.Strong Inductive Step: We want to show that [P(0) ∧ P(1) ∧ · · · ∧ P(n)] → P(n + 1).To this end, suppose that P(0), P(1), · · · , P(n) are all true and that n + 1 ∈ A.We consider two cases.CASE 1: ¬∃m(m ∈ A ∧ m < n + 1). In this case, n + 1 is the least element of A.CASE 2: ∃m(m ∈ A ∧ m < n + 1). In this case, since P(m) is true, A has a least element.Either way, we conclude that P(n + 1) is true.So, by strong mathematical induction, we obtain that P(n) is true for all n ∈ N. Since A is not empty, we can pick an n ∈ A. Moreover, since P(n) is true, this implies that A has a least element.
Does anyone really make money through dropshipping on Shopify?
Yes, I do…In fact, I know tons of people who are making not thousands, but hundreds of dollars buying products from Aliexpress and selling them on Shopify at a higher rate.But yeah, it is true that there are many other people who got no success, not even a single sale with Shopify dropshipping business.And if you ask them why they failed, they would probably say Shopify sucks.But the truth is, Shopify is not the reason of their failure.They just had a wrong start and forgot the key principle for getting success with Dropshipping business.So if you start Shopify dropshipping business just like them, then yeah, you will not be able to make a single dime.So before starting off, make sure you are following the key principle..What the heck is that key principle, dude?Well, it is selecting a niche…..You know, with dropshipping business you can sell almost everything on Shopify.But should you really sell everything?No.If you try to sell everything, chances are you will end up with selling nothing.Because when a customer will visit your store and notice that you are selling socks, baby clothes, beauty items, and other tech stuff, he would start thinking that you are just another desperate seller trying to sell everything just to make money.And it will turn them off.So if you want to create trust and a brand loyalty, you need to work with a particular niche.You know, there are many profitable niches you can find out there that can help you generate a decent amount of profit. All you have to do is to find out those profitable niches.See here which niches are most profitable for shopify dropshipping business in 2017.Hope it helpsCheers……….
Does anyone think Amway is a cult?
Yes! It is helpful to fully understand the meaning of the word cult to know why. cult Definition cult (kult) noun 1. 1. a system of religious worship or ritual 2. a quasi-religious group, often living in a colony, with a charismatic leader who indoctrinates members with unorthodox or extremist views, practices, or beliefs 2. 1. devoted attachment to, or extravagant admiration for, a person, principle, or lifestyle, esp. when regarded as a fad i.e. the cult of nudism 2. the object of such attachment 3. a group of followers; sect Is Amway a religion? Yes it is. re·li·gion (ri lij′ən) noun * expression of such a belief in conduct and ritual * any object of conscientious regard and pursuit Amway and many other Network Marketing/ MLM companies teach you to separate from outsiders who are negative towards your efforts. They teach you that those who do not agree with your business choice, are simply "close minded." There are many other examples of why many would call Amway a cult. You can find some great examples at http://www.angelfire.com/or/amwaydreamers/index2.html **************************************... Most importantly do not show animosity towards your wife. Continue to show love and support. Concern is great. It is good to take the time to discuss concern. Do not openly attack her and what she is doing. Most people in a traditional network marketing or mlm business are used to attack and are always on the defensive. If you can have a conversation without attack and express concern without control, your efforts will not go unnoticed. I hope this has been helpful.
How do I prove that the following function is divisible by 9 for any natural number n?
I will explain you this with the help of binaomial expansionJust write 4^n = (1+3)^n and expand binomialC0+C1*3+C2*3^2+……. {where Cr = fact(n)/(fact(r)*fact(n-r))so 1+3*n+3^2*n(n-1)/2+…..and so onnow coming to the given equation 4^n-3*n-1write 1+3*n+3^2*n(n-1)/2+…… -3*n-1so we get 3^2*n(n-1)/2 + 3^3*n(n-1)(n-2)/(2*3)+……which is divisible by 3^2 or 9I guess you got it..
Why was Cantor's work initially opposed?
Among other reasons, because he assumed that every set has a well-ordering. He regarded this principle as self-evident. Many other people did not (and still don’t) because there are many important sets (i.e. the real numbers) for which nobody has been able to actually exhibit a well-ordering.Ernst Zermelo decided to side-step the issue by proposing the Axiom of Choice. Essentially, using this axiom is equivalent to saying “Every set has a well-ordering… because we say it does.”