"The present is the key to the past." This statement relates to _____

The universe is presently 98% hydrogen and helium. Indicate whether the statement is true or false

________ are designed to provide mechanical support at the base of a slope

Fill in the blank(s) with correct word

Which of the following related to the promise of solar energy is incorrect?

A) The Earth receives 100,000 terawatts of solar energy per hour. B) The energy produced by fossil fuels in the U.S. in a year is equivalent to 35 minutes of insolation. C) The technology for solar energy is not yet available for widespread use. D) Periods of cloudiness and night are current drawbacks to available solar technology.

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