Mathematics

Mathematics

12 Followers | 6 Entries

Entries on Mathematics

Acc 101 ( Basic Accounting i)

Acc 101 ( Basic Accounting i)

Uploaded by Jonah Helen

ASSIGNMENT

 
0.0 (0 reviews)
Glow Like Moon With the Lady With Focus

Glow Like Moon With the Lady With Focus

EXPLORE FULL CONTENTS OF THIS BOOK TO LEARN MORE, BELOW SHOWS THE HIGHLIGHTS OF EACH CHAPTER: Chapter 1: Glow Like Moon (What Does It Mean For You To Glow Like Moon) Chapter 2: The Lady With Focus (What The lady with focus can offer to help you glow like Moon) Chapter 3: Inner Healing (Before you begin to live towards your aspirations, you must first be in a good relationship with yourself by aligning with your inner-mind) Chapter 4: Spirituality (After you align with yourself, you must strive to be in good terms with God, unless your enemies will never allow you to succeed in your aspirations) Chapter 5: Network, Connect & Relate (If God is on your side and Man is not there to help, how will you then succeed? You must connect with people you meet to succeed) Chapter 6: Power To Succeed (Anything the human mind can believe, the human mind can achieve; this is the Supreme Secret. You have the power to succeed and you must be positive about this fact) Chapter 7: Peace of Mind (“You mustn’t be rich or have connection to be great”. Wealth without inner peaceful mind is simply empty, keep calm and let your mind always be at peace because greatness does not come without peace of mind).

 
0.0 (0 reviews)
Representation Theory of the Symmetric Group Sn

Representation Theory of the Symmetric Group Sn

Casting a look on the treatise, starting with group and it was defined as a nonempty set G closed under the binary operation ∗ such that the some axioms are satisfied. Types of group, the symmetric group Sn, transposition, cycle type of G, definition of representation theory of a group G which is a homomorphism ρ : G → GL(V) for some vector space V. i.e for all g,h ∈ G we have GL(V) ρ(g ∗h) = ρ(g)∗ρ(h), historical remark of representation theory and some examples were also discussed in this chapter. In chapter two, Matrix representation was discussed as a map such that ρ(gh) = ρ(g) ρ(h). ρ : G→GLn(C) Irreducible representations were also discussed with their definitions. Theequivalency of any two representations (ρ,V ) and (σ,U) of the same group G was also defined in this chapter. Chapter three of this project deals with conjugacy classes in the symmetric group Sn and it was defined as two elements g and g∈ G are called conjugate if there exists h ∈ G such that g= hgh−1, also the conjugacy class of g ∈ G was said to be {hgh−1|h ∈ G}, where G is the union of different conjugacy classes. Similarly in this chapter , we said that an inner product < u,v > is ρ-invariant if for all h ∈ G we have < u,v >=< ρ(h)u,ρ(h)v > for all u,v ∈ V. Also in this chapter, the definition of character of a representation, central function, group algebra of G, faithful representation, direct product of representations, canonical inner product were also provided. Some theorems, lemma and propositions were stated and proved.

 
5.0 (1 reviews)
Substrate Effect on Crystallinity Development in Thin Film Nanocrystalline Silion

Substrate Effect on Crystallinity Development in Thin Film Nanocrystalline Silion

Thin film nanocrystalline silicon is an attractive material for thin film photovoltaic application. It is known to suffer less degradation than amorphous silicon.

 
0.0 (0 reviews)