Which of the following viral diseases has been acquired in the United States by handling pet prairie dogs?

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

Interspecific genome studies show us conserved sequences, but intraspecific comparisons identify what?

What will be an ideal response?

Even though the steps of photosynthesis that actually produce sugar molecules are part of the carbon

fixation reactions, the light-dependent reactions are absolutely essential for sugar synthesis. Explain the role of the light-dependent reactions in the formation of the end products of photosynthesis. What will be an ideal response?

Which types of phenotypic ratios are likely to occur in crosses when dealing with three gene pairs for which all the genotypic combinations are of equal viability?

A) 12:3:1, 9:7 B) 1:2:1, 3:1 C) 2:3, 1:2 D) 1:4:6:4:1, 1:1:1:1 E) 27:9:9:9:3:3:3:1