Olympus Mars, the largest volcano in the solar system, is
a. on Venus.
b. a shield volcano.
c. covered with an ice cap.
d. indicative of active plate tectonics.
b. a shield volcano.
You might also like to view...
Thunderstorms are rare in the tropics
Indicate whether the statement is true or false
What is the relationship between seafloor spreading and reversals in the Earth's magnetic field
What will be an ideal response?
[NeedAttention]
src="data:image/png;base64,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
What is the sum of the atomic masses of all the atoms in sucrose, C12H22O11?
A) 342 amu B) 182 amu C) 270 amu D) none of the above