A normal chromosome has the following sequence: L M N O o P Q R S T (o = centromere). Name the type of chromosomal aberration present in each of the following chromosomes which arose from the original sequence shown above, being as specific as possible. Then draw how the chromosomes line up during meiosis L O o P Q R S T: L M N O o P Q R S T: L M N Q P o O...
1. Use the DPP to decide whether the following sets of clauses are satisfiable. (a) {{¬Q,T},{P,¬Q},{¬Q,¬S},{¬P,¬R},{P,¬R,S},{Q,S,¬T},{¬P,S,¬T},{Q,¬S},{Q,R,T}} (b) {{¬Q,R,T},{¬P,¬R},{¬P,S,¬T},{P,¬Q},{P,¬R,S},{Q,S,¬T},{¬Q,¬S},{¬Q,T}} 2. Decide whether each of the following arguments are valid by first converting to a question of satisfiability of clauses (see the Proposition), and then using the DPP. (Note that using DPP is not the easiest way to decide validity for these arguments, so you may want to use other methods to check your answers) (a) (P → Q), (Q → R),...
Validate the following arguments: a. ( ~p ∧ ((q ∧ r) → s) ∧ (s → p) ∧ (~(q ∨ r) → t ) → t b.( (p → r) ∧ q ∧ (q → ~r) ∧ r ) → ~p
N 3. Q+ "S 4.PNS 5. NS "R 6. PMR KPremise)/:P "R 1, 3, CA 2, CONTR 4, 5, CA mts Identify which Group I or Group II Rule was used in Deductions. (2) Ask Print 1. P - Q (Premise) 2. R - ("S v T) (Premise) 3. p R (Premise)/: ("Q & S) T 4.NQ NP 5. "Q R 6. "Q ("S v T) 7. "Q ( ST) 8. ("Q & S) T References (Premise) |(Premise) (Premise)/: ("Q...
d) An individual is heterozygous for the following reciprocally translocated chromosomes (* denotes the centromere): M-N-O-P-*-Q-R-S V-w-x-*-y-z V-W-P-*-Q-R-S M-N-O-x-*-y-z Which non-recombinant haploid gametes below will result in a deficiency or duplication of genetic material in the fertilized embryo? O Gamete A: M-N-O-P-*-Q-R- S M -N-O-x-*-y-z O Gamete B: M-N-O-P -Q-R- S V -W-X--y-z O Gamete C: M-N-O-x-*-y-z V-W-P--Q-R-S O Gamete D: V-W-P-*-Q-R-S V-W-X-*-y-z f) What is the frequency of each of these non-recombinant gametes? Number g) Which form of segregation...
Please give proof direct or indirect with numbered justification/law. (a) t→r, ¬(r∨¬q), ¬t→p, p→(s∨¬q) ⇒ s (b) (s→q)∧(p→t) ⇒ (s∨p)→(q∨t)
Using inference rules Show that the argument form with premises (p t) rightarrow (r s), q rightarrow (u t), u rightarrow p, and s and conclusion q rightarrow r is valid by first using Exercise 11 and then using rules of inference from Table 1.
Q2. Let u and v be non-parallel vectors in Rn and define Suv (a) Does the point r lie on the straight line through q with direction vector p? (b) Does the point s lie on the straight line through q with direction vector p? (c) Prove that the vectors s and p -r are parallel. (d) Find the intersection point of the line {q+λ p | λ E R} and the line through the points u and v. Q3....
Consider the following statement Provide one definition of a non-empty set U, and predicates P, Q, and R over U, that makes the above statement true, and another definition of a non-empty set U, and predicates P, Q, and R that makes the statement false. Briefly justify your answers, but no formal proofs are necessary. Consider the following statement Provide one definition of a non-empty set U, and predicates P, Q, and R over U, that makes the above statement...
determine whether the argument is balud usinf the eight rules of standard deduction Page 2) 1.-P → (Q v (R & S)) 2. P→Q 3. -Av Q 4-Q / ~RvS 3) 1, ~P → Q 4. S Page 2) 1.-P → (Q v (R & S)) 2. P→Q 3. -Av Q 4-Q / ~RvS 3) 1, ~P → Q 4. S