The underlying problem in Gaucher disease is ____

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

In the cells of a female mammal, ________ is(are) inactivated

a. either the maternal or paternal X chromosome b. all maternal X chromosomes c. all paternal X chromosomes d. both the maternal and paternal X chromosomes

The structure of DNA is often described as a twisted ladder. The rungs of the ladder represent the sugar phosphate chains. Is this an accurate description? Why or why not?

What will be an ideal response?

Which of the following happens first in the

PCR process?

a. repeated cycles of high and low temperatures b. mixing of DNA polymerase with template DNA, nucleotides, and primers c. DNA hybridization d. DNA synthesis e. DNA unwinds