Answer:
Wheres the question?, that can allow me to help you better. I have been researching Susan B. Anthony as well.
Explanation:
Reading up on the topics and finding the most interesting, shocking things about this topic.
Speaking to other people and find out why it motivates them.
Making yourself vulnerable as a writer is a key to being a successful writer. Dare to expose why you are personally invested in a topic and how it has affected you. Share your story – nobody else can tell it. Be flexible about sharing some details. You do not have to tell your life story in order to get people to listen – just share some information that is interesting and revolves around a certain topic.
For example, if you were writing about ice cream, make it personalized. Writing like a robot can make even ice cream sound unappetizing. Nobody really wants to read an article that begins with, “Ice cream tastes great. Many people like it.” Try something more personal: “The first time I took a delicious, creamy morsel of frozen, chocolately ice cream into my mouth, I smiled, and proceeded to eat the whole bowl.”
Hope this helps. :)
here you go your answer dear friend
It is clear that a(n)=2^(1-2^(-n)). In fact, for n=1 this produces 2^(1-1/2)=sqrt(2)=a1 and if it is true for a(n) then a(n+1) = sqrt (2 * 2^(1-2^(-n))) = sqrt(2^(2-2^(-n))) = 2^(1-2^(-(n+1))) (a) clearly 2^(1-2^(-n))<2<3 so the sequence is bounded by 3. Also a(n+1)/a(n) = 2^(1-2^(-n-1) - 1+2^(-n)) = 2^(1/2^n - 1/2^(n+1)) = 2^(1/2^(n+1)) >1 so the sequence is monotonically increasing. As it is monotonically increasing and has an upper bound it means it has a limin when n-> oo (b) 1-1/2^n -> 1 as n->oo so 2^(1-2^(-n)) -> 2 as n->oo
Answer:
it would be id i believe since it has nothing to do with his ego. so it would eliminate both ego and superego.