📐 SAT
📝 ACT
🎓 AP Exams
About Contact Blog Privacy Policy

AP Biology — Unit 7 — Population Genetics — Drill 30

Drill 30 ·

0 / 5
0/5 correct

Nice work!

Review your answers above to learn from any mistakes.

← More Drills
Previous drill
Drill 29
Next drill
Drill 31
More AP Bio drills
Drill 1 5 questions → Drill 2 5 questions → Drill 3 5 questions → Drill 4 5 questions → Drill 5 5 questions → Drill 6 5 questions → Drill 7 5 questions → Drill 8 5 questions → Drill 9 5 questions → Drill 10 5 questions → Drill 11 5 questions → Drill 12 5 questions → Drill 13 5 questions → Drill 14 5 questions → Drill 15 5 questions → Drill 16 5 questions → Drill 17 5 questions → Drill 18 5 questions → Drill 19 5 questions → Drill 20 5 questions → Drill 21 5 questions → Drill 22 5 questions → Drill 23 5 questions → Drill 24 5 questions → Drill 25 5 questions → Drill 26 5 questions → Drill 27 5 questions → Drill 28 5 questions → Drill 29 5 questions →
Drill 30 — current you are here
Drill 31 5 questions → Drill 32 5 questions → Drill 33 5 questions → Drill 34 5 questions → Drill 35 5 questions → Drill 36 5 questions → Drill 37 5 questions →

About This Drill

AP Biology — Unit 7 — Population Genetics — Drill 30 is a practice drill. It contains 5 original questions created by Brian Stewart, a Barron's test prep author with over 20 years of tutoring experience.

Apply Hardy-Weinberg equations to calculate allele and genotype frequencies, then analyze how introducing selection disrupts equilibrium predictions. This drill requires multi-step math and conceptual reasoning about population genetics.

Passage

A population of beetles (Tribolium castaneum) is maintained in a laboratory. The beetles exhibit a heritable difference in body color: red (dominant, R) versus black (recessive, rr). A researcher establishes that the population is currently in Hardy-Weinberg equilibrium for this locus. A census of 500 beetles reveals the following phenotype counts:
Table 1. Beetle phenotype counts (n = 500).
PhenotypeCount
Red (R_)320
Black (rr)180

The researcher then introduces a selective pressure: black beetles in the population are 30% less likely to survive to reproductive maturity per generation than red beetles. All other Hardy-Weinberg assumptions (no mutation, random mating, no migration, large population) remain in effect except for natural selection.

Questions in This Drill

  1. Based on the phenotype data in Table 1, what is the frequency of the recessive allele (r) in this population?
  2. Based on your calculation of allele frequencies, what is the expected frequency of heterozygous (Rr) beetles under Hardy-Weinberg equilibrium?
  3. After one generation of selection against black beetles (30% lower survival), which change in the population is most consistent with the principles of natural selection?
  4. A student argues: "Because the r allele is protected in heterozygotes, selection will never completely eliminate it from the population." Evaluate this claim.
  5. If heterozygous beetles (Rr) had slightly higher reproductive success than either homozygote, this would be an example of which evolutionary mechanism, and what would be the long-term outcome?