Which statement concerning body symmetry is NOT correct?

[NeedAttention]

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

Linkage between a gene of interest and a DNA marker is being studied. A mating results in 6 parental and 3 recombinant offspring. What additional data would increase your confidence that the gene of interest and the DNA marker are linked? (Select all that apply.)

A) Analysis of another mating from the same pedigree that produced 4 parental and 4 recombinant offspring. B) Analysis of a mating from a different pedigree that produced 4 parental and 4 recombinant offspring. C) Analysis of a mating from a different pedigree that produced 6 parental and 2 recombinant offspring. D) Analysis of another mating from the same pedigree that produced 6 parental and 2 recombinant offspring.

Competitive exclusion is based on the idea that

a. one species will hold some sort of advantage over the other one. b. no two species can completely occupy the same niche. c. the more two species overlap in their capacity to obtain and use resources the less likely they are to coexist. d. all of these are true. e. none of these are true

What are the functional units of the kidneys?

What will be an ideal response?