Nature of Science
Earth Systems
Space
Organisms & Populations
Physical Science
100
Ms. Nichols has a model of the solar system on the board. Why is this model useful?
A.) It shows the exact distance between the sun and planets.
B.) It gives a visual representation of the planet order.
C.) It shows the exact size of each planet.
B. It gives a visual representation of the planet order. The solar system is so large that it is difficult to see all the planets in the correct order.
100
What must happen in order for a metamorphic rock to be transformed into an igneous rock?
A. It must be compressed by high temperatures and pressure within Earth's crust.
B. It must be soaked in water until it dissolves and reforms in a different shape.
C. It must be pulled under Earth's crust, melted, and forced out above the crust to cool.
D. It must be weathered into sand grains and compressed into multiple layers.
D. It must be weathered into sand grains and compressed into multiple layers.
100
The sun is much larger than the moon. However, as viewed from Earth, the sun and moon appear to be the same size. Why do the sun and moon appear to be the same size when viewed from Earth?
A. The moon is much hotter than the sun.
B. The moon is much denser than the sun.
C. The moon is much brighter than the sun.
D. The moon is much closer to Earth than the sun.
D. The moon is much closer to Earth than the sun.
100
Structures in the human body work together to perform specific functions. The chart below shows the organization of structures found in the human body.
Cell -> _______ -> Organ -> Organ System -> Organism
What word is missing?
A.) Organelle
B.) Atom
C.) Tissue
D.) Colony
C.) Tissue
100
The diagram shows the three states of matter.
Which diagram shows the state of matter in which particles take on the shape, but not volume, of their container?
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
A. 1
200
Sara is studying the human skeletal system. Her classroom has a model skeleton. What main advantage does a model skeleton have over a drawing of a skeleton?
A. It shows how the body moves.
B. It displays all of the bones at once.
C. It displays the skeleton in three dimensions.
D. It makes it easier to learn the names of each bone.
C. It displays the skeleton in three dimensions. This is an advantage over a 2-dimensional drawing.
200
Over time, repeated cycles of heating and cooling can cause a rock to crack. The rock may then break into smaller pieces.
What is this process called?
A. Deposition
B. Erosion
C. Subsidence
D. Weathering
D. Weathering
200
The diameter of Saturn is nearly ten times that of Earth. However, the density of Saturn is much less than that of Earth. What is the reason for this?
A.Earth is farther from the sun than Saturn.
B.Saturn has a ring system.
C.Earth is hotter than Saturn.
D.Saturn is a gaseous planet.
D.Saturn is a gaseous planet.
200
Which characteristic is shared by all cells?
A. They need energy.
B. They reproduce sexually.
C. They make their own food.
D. They move from place to place.
A.) They need energy.
200
Ted wants to know the average atomic mass of calcium. He knows that the letters Ca stand for calcium. He found the entry for calcium, Ca, in Period 4 of the periodic table. The diagram below shows this entry.
Which of the following numbers should Ted identify as the average atomic mass of calcium, Ca?
A. 4
B. 20
C. 40.078
D. 60.078
C. 40.078
300
Which of the following is not a model?
A.) Using a computer to show the potential direction of a hurricane.
B.) Drawing a molecule of water to show the molecular bonds between Hydrogen and Oxygen.
C.) Spinning a basketball on your finger to show your classmates what, "planetary rotation" looks like.
D.) Separating iron from salt using a magnet.
D.) Separating iron from salt with a magnet.
300
Chang drew the diagram below to show that Earth’s axis of rotation is not perpendicular, but tilted.
Which of the following does the tilt of the axis of rotation best explain?
A.) Why Earth has tides
B.) How long an Earth day is
C.) How long an Earth year is
D.) Why Earth has seasons
D.) Why the Earth has seasons
300
The Sun's energy and composition is provided by which of the following?
A. The burning of fossil fuels within the Sun
B. Solar power that produces electricity in the Sun
C. The Sun's magnetic field
D. The fusion of hydrogen into helium
D. The fusion of hydrogen into helium
300
The survival of cells depends on maintaining homeostasis.
What will happen to a cell if homeostasis is not maintained?
A.The cell will immediately divide.
B.Cell processes will continue unchanged.
C.The cell will eliminate wastes more efficiently.
D.Many chemical reactions in the cell will slow down or even stop.
D.Many chemical reactions in the cell will slow down or even stop.
300
A piece of titanium has a mass of 18 grams. Using a graduated cylinder partly filled with water, a scientist found that the titanium displaced 4 milliliters of water.
What is the density of titanium?
A. 0.22 g/cm 3
B. 4.5 g/cm 3
C. 18 g/cm 3
D. 324 g/cm 3
B. 4.5 g/cm 3
400
Bernard is designing a new boat. His first step is to use a computer modeling software to create and test his design in simulated weather and wave conditions. How does Bernard benefit from using a computer-generated model instead of a full-sized boat?
A.) It is more cost-effective and safer for him to test.
B.) It is easier to communicate his findings to others.
C.) It allows him to observe things he could not normally see.
D.) It proves that his design will work in real weather conditions.
A.) It is more cost-effective and safer for him to test.
400
What is the law of superposition?
A.) Igneous rock is older than nearby sedimentary rock, which is older than nearby metamorphic rock.
B.) A sedimentary rock layer in its original position is older than the layers above it and younger than the layers below it.
C.) Metamorphic rock is older than nearby sedimentary rock because sedimentary rock is deposited before metamorphic rock forms.
D.) The exact age of a sedimentary rock layer can be found using the layers above and below it, even if the layers are not in their original positions.
B.) A sedimentary rock layer in its original position is older than the layers above it and younger than the layers below it.
400
Which of these choices states Newton’s law of universal gravitation?
A. As a planet moves around its orbit, the planet sweeps out equal areas in equal amounts of time.
B. The orbit of a planet, or other body, around the sun is an ellipse, with the sun at one focus of the ellipse.
C. The square of a planet’s orbital period is proportional to the cube of the planet’s mean distance from the sun.
D. Gravitational force increases as the mass of an object increases or as the distance between two objects decreases.
D. Gravitational force increases as the mass of an object increases or as the distance between two objects decreases.
400
Every cell in our body needs oxygen and nutrients to produce energy. When we inhale, oxygen is taken into and transported to various parts of the body. Cells use oxygen to break down the nutrients we get from the food we eat to release energy. During this process, waste products are produced.
●
Which organ systems work together during the process described above?
A.The immune, excretory, and nervous systems
B.The reproductive, nervous, and digestive systems
C.The respiratory, circulatory, and digestive systems
D.The musculoskeletal, circulatory, and reproductive systems
C.The respiratory, circulatory, and digestive systems
400
If you walk barefoot on hot asphalt, energy is transferred by which process?
A. Convection
B. Radiation
C. Conduction
D. Reflection
C. Conduction
500
Draw a Bohr Model of Nitrogen (hint: Nitrogen has 7 Protons and an Atomic Mass of 14.0067).
500
The climate of an area can be different from its weather.
Which of the following statements describes the climate of an area?
A. There should be heavy rains tomorrow morning.
B. The rains next week are expected to cause some flooding.
C. The average temperature from 1930–1996 was 23°C (74°F).
D. The high temperature on September 4, 2009, was 32°C (89°F).
C. The average temperature from 1930–1996 was 23°C (74°F).
500
An astronomer uses a telescope to observe a star. She observes that the color of this star is similar to the color of the sun. Therefore, she infers that the star and the sun have similar sizes and surface temperatures. Using this information, what can the astronomer conclude about the star?
A. The star is a white dwarf.
B. The star is medium sized.
C. The star is hotter than most other stars in our galaxy.
D. The star is brighter than most other stars in our galaxy.
B. The star is medium sized.
500
What is the primary role of decomposers in an ecosystem?
A. To control the population of producers and consumers
B. To compete with producers for energy and other resources
C. To provide a source of energy for the producers in the ecosystem
D. To recycle energy and materials from dead producers and consumers
D. To recycle energy and materials from dead producers and consumers
500
A magnet was placed near a pile that contained both iron and sulfur. The magnet was moved gradually closer to the pile. As it neared the pile, the magnet started attracting small pieces of iron from the pile.
Which of these statements best describes the contents of the pile?
A. It is a solution of iron and sulfur that can be separated by magnetism.
B. It is a heterogeneous mixture of iron and sulfur that can be separated by magnetism.
C. It is a compound of iron and sulfur that can be separated by magnetism.
D. It is a suspension of sulfur in iron that can be separated by magnetism.
B. It is a heterogeneous mixture of iron and sulfur that can be separated by magnetism.