Let us look at the algebraic identity: (a + b)² = a² + 2ab + b², and try to understand this identity in algebra and also in geometry. As proof of this formula, let us try to multiply algebraically the expression and try to find the formula. (a + b)² = (a + b) (a + b) = a(a + b) + b(a + b) = a² + ab + ab + b². This expression can be geometrically understood as the area of the four sub-figures of the below-given square diagram. Further, we can consolidate the proof of the identity (a + b)²= a² + 2ab + b².

1.what is the best relationship generated by the Auxotrophic mutant and the yeast plasmid recombinant?

2.show the replication criteria for the REP1 and REP2 genes

3.propose the conspicuous size of the 2 micrometer circle?

4.relate the plasmid to the 2 micrometer circle

5.justify accordingly; Plasmids are present in eukaryotes.

6.to which categorization can the best fit of Saccharomyces cerevisiae apply?

7. interrelate the Large scale production to the cloning vector

8.explain on the YEP as the highest efficiency of transformation

9. Why is a high transformation frequency needed?make sure you explain

10.explain the decision criteria between the Choice of vector and the Transformation frequency