Answer:
Betty should note the time and date and mention that the buyer has not signed the form and can then proceed to make the disclosure.
Explanation:
In this case, the Broker are in a position where they are needed to make the agency disclosure. But, it must be understood that the buyer does not have to sign any disclosure form. Hence, they can have the discussion as long as Betty, the broker, has signed the disclosure.
How to have more fun and live life to the fullest
<span>Supreme Court, District Court and the</span><span><span> Circuit Court are the three federal courts. Sorry I'm late, hope this helps! :)</span> </span>
Hello. You forgot to put the quote. The quote is:
"A large income is the best recipe for happiness I ever heard of."—Jane Austen
Answer and Explanation:
We cannot consider a good income as the only reason to be happy, since happiness is something you cannot buy and money is a finite thing, which promotes fleeting happiness. However, we cannot disagree that income is one of the factors that profoundly influence people's happiness, even without being the main factor. This is because we are happy when our needs are met, although a good income cannot meet our emotional needs, it is the only factor capable of meeting our physical and economic needs. Without a good income, we will experience difficulties and will not be happy, since love, affection and companionship cannot meet the needs of food, home and many others.
Answer:
p-value
Explanation:
p-value: In statistics, the term p-value is defined as the probability of getting the observed results of a particular test, which leads to the assumption that the null hypothesis of the research or test is correct. p-value describes the level of marginal significance that underlies in a statistical hypothesis test that represents an event's occurrence probability.
In any of the statistical analyses, if the p-value is considered as less than 0.05 then the null hypothesis is being rejected and it is explained that there's no seen difference between two different means and hence a conclusion is made describing that a significant difference exists.
In the question above, the statement signifies the significance of the p-value.
