All Common Core: High School - Geometry Resources
Example Questions
Example Question #1 : High School: Geometry
A truck is traveling down a hill, which of the following statements is/are true?
None of the other answers.
The body of the truck is parallel to the hill.
The truck tires are parallel to the hill.
The body of the truck is perpendicular to the hill.
The body of the truck is not perpendicular to the hill.
The body of the truck is not perpendicular to the hill.
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of parallel and perpendicular lines, since those terms are among the answer selections.
Parallel lines: In a plane, parallel lines are lines that will never intersect. This means they have the same slope but different intercepts.
Perpendicular lines: In a plane, perpendicular lines are lines that intersect by creating a degree angle. This also means they have opposite sign, reciprocal slopes.
Now, look at the aspects of this particular problem.
"A truck is traveling down a hill"
From this statement, it cannot be assumed that the hill is a straight line nor can it be assumed that the hill goes on forever. Therefore, the truck and the hill will never be parallel. Also, for these same reasons it is known that the truck will never be perpendicular to the hill. The relation of the truck's tires to the hill will never be parallel since they constantly touch.
Thus, the correct answer choice is,
"The body of the truck is not perpendicular to the hill."
Example Question #2 : Angle, Circle, Perpendicular And Parallel Lines, And Line Segment Definitions: Ccss.Math.Content.Hsg Co.A.1
A truck is traveling up a hill, which of the following statements is/are true?
None of the other answers.
The body of the truck is not perpendicular to the hill.
The body of the truck is parallel to the hill.
The body of the truck is perpendicular to the hill.
The truck tires are parallel to the hill.
The body of the truck is not perpendicular to the hill.
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of parallel and perpendicular lines, since those terms are among the answer selections.
Parallel lines: In a plane, parallel lines are lines that will never intersect. This means they have the same slope but different intercepts.
Perpendicular lines: In a plane, perpendicular lines are lines that intersect by creating a degree angle. This also means they have opposite sign, reciprocal slopes.
Now, look at the aspects of this particular problem.
"A truck is traveling up a hill"
From this statement, it cannot be assumed that the hill is a straight line nor can it be assumed that the hill goes on forever. Therefore, the truck and the hill will never be parallel. Also, for these same reasons it is known that the truck will never be perpendicular to the hill. The relation of the truck's tires to the hill will never be parallel since they constantly touch.
Thus, the correct answer choice is,
"The body of the truck is not perpendicular to the hill."
Example Question #1 : Congruence
There exists four points on a certain line A. Which of the following is true?
The points are equidistant
None of the other answers
The points are perpendicular
The points are parallel
The points are collinear
The points are collinear
First, recall the definitions of the terms in the possible answer choices.
Collinear: Represents points that all fall on the same line.
Equidistance: Represents points that are the same length away from one another.
Parallel: In a plane, parallel lines are lines that will never intersect. This means they have the same slope but different intercepts.
Perpendicular: In a plane, perpendicular lines are lines that intersect by creating a degree angle. This also means they have opposite sign, reciprocal slopes.
Therefore, the correct answer is collinear.
Example Question #3 : High School: Geometry
The seat of a swing on a swing set is attached to the top horizontal bar by two chains that are exactly inches from each other and of equal length. The seat of the swing is also inches. Which of the following statements describes the geometric relationship between one of the chains and the horizontal bar it is attached to?
Neither
Parallel
Perpendicular
Perpendicular
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of parallel and perpendicular lines, since those terms are among the answer selections.
Parallel lines: In a plane, parallel lines are lines that will never intersect. This means they have the same slope but different intercepts.
Perpendicular lines: In a plane, perpendicular lines are lines that intersect by creating a angle. This also means they have opposite sign, reciprocal slopes.
Now, look at the aspects of this particular problem.
"The seat of a swing on a swing set is attached to the top horizontal bar by two chains that are exactly inches from each other and of equal length. The seat of the swing is also inches."
The question is asking to define the relationship between one of the chains and the horizontal bar it is attached to. Since the swing will hang directly down from the two chains and the bar is horizontal to ground it can be assumed that the chain and the bar form a angle and thus, they are perpendicular to one another.
Example Question #2 : Congruence
The seat of a swing on a swing set is attached to the top horizontal bar by two chains that are exactly inches from each other and of equal length. The seat of the swing is also inches. Which of the following statements describes the geometric relationship between the two chains?
Parallel
Neither
Perpendicular
Parallel
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of parallel and perpendicular lines, since those terms are among the answer selections.
Parallel lines: In a plane, parallel lines are lines that will never intersect. This means they have the same slope but different intercepts.
Perpendicular lines: In a plane, perpendicular lines are lines that intersect by creating a angle. This also means they have opposite sign, reciprocal slopes.
Now, look at the aspects of this particular problem.
"The seat of a swing on a swing set is attached to the top horizontal bar by two chains that are exactly inches from each other and of equal length. The seat of the swing is also inches."
The question is asking to define the relationship between the two chains that hold the swing to the swing set. Since the two chains are exactly inches apart from one another and attached to the pole which is horizontal from the swing and the swing seat itself is inches, it is concluded that the two chains are parallel to one another.
Example Question #3 : Congruence
The seat of a swing on a swing set is attached to the top horizontal bar by two chains that are exactly inches from each other and of equal length. The seat of the swing is also inches. Which of the following statements describes the geometric relationship between the horizontal bar and the swing?
Parallel
Perpendicular
Neither
Parallel
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of parallel and perpendicular lines, since those terms are among the answer selections.
Parallel lines: In a plane, parallel lines are lines that will never intersect. This means they have the same slope but different intercepts.
Perpendicular lines: In a plane, perpendicular lines are lines that intersect by creating a angle. This also means they have opposite sign, reciprocal slopes.
Now, look at the aspects of this particular problem.
"The seat of a swing on a swing set is attached to the top horizontal bar by two chains that are exactly inches from each other and of equal length. The seat of the swing is also inches."
The question is asking to define the relationship between the horizontal bar and the swing seat. Since the two chains are exactly inches apart from one another and of equal length and attached to the pole which is horizontal from the swing and the swing seat itself is inches, it is concluded that the seat and the horizontal bar are parallel to one another.
Example Question #4 : Congruence
A circular pizza is cut into equal slices. Which of the following is an accurate mathematical description of one of the pizza slices?
The central angle of one pizza slice is degrees.
The central angle of one pizza slice is degrees.
None of the answers.
The central angle of one pizza slice is degrees.
The central angle of one pizza slice is degrees.
The central angle of one pizza slice is degrees.
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of circles and corresponding angles.
A central angle is known as the angle of a circle where the vertex of the angle is located at the center of the circle.
A circle is composed of 360 degrees.
Knowing these characteristics, solve for the central angle of one slice of pizza.
Therefore, the correct answer is
"The central angle of one pizza slice is degrees."
Example Question #8 : Angle, Circle, Perpendicular And Parallel Lines, And Line Segment Definitions: Ccss.Math.Content.Hsg Co.A.1
A circular pizza that has a radius of inches and is cut into equal slices. Which of the following is an accurate mathematical description of one of the pizza slices?
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of circles and corresponding angles.
A central angle is known as the angle of a circle where the vertex of the angle is located at the center of the circle.
A circle is composed of 360 degrees.
The circumference of a circle is the length around the circle and the radius is the length from the center of the circle to any point on the circle's edge.
For this particular question, calculate the circumference and then calculate the arc length of each slice pizza slice.
Since there are 8 equal slices, divide the circumference by 8.
Therefore, the correct answer is
"The arc length of one slice of pizza is inches."
Example Question #1 : High School: Geometry
Looking at the given clock where the radius is inches, which of the following statements accurately describes the space between the hour and minute hand?
The area between the hour and minute hand is
The area between the hour and minute hand is
None of the answers.
The area between the hour and minute hand is
The area between the hour and minute hand is
The area between the hour and minute hand is
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of circles and corresponding angles.
A central angle is known as the angle of a circle where the vertex of the angle is located at the center of the circle.
A circle is composed of 360 degrees.
The area of a circle is found by using the formula .
For this particular problem first calculate the area of the clock.
Now, since the clock reads 4:50, the distance between the hour and minute hands is of the total clock. From here, calculate the area between the two hands.
Therefore, the correct answer is
The area between the hour and minute hand is .
Example Question #10 : Angle, Circle, Perpendicular And Parallel Lines, And Line Segment Definitions: Ccss.Math.Content.Hsg Co.A.1
Looking at the given clock where the radius is inches, which of the following statements accurately describes the space between the hour and minute hand (Going clockwise)?
The angle between the hour and minute hand is greater than degrees.
None of the answers.
The angle between the hour and minute hand is greater than degrees.
The angle between the hour and minute hand is less than degrees.
The angle between the hour and minute hand is less than degrees.
The angle between the hour and minute hand is greater than degrees.
This question is trying to put a mathematical definition to a real life situation. First, recall the definitions of circles and corresponding angles.
A central angle is known as the angle of a circle where the vertex of the angle is located at the center of the circle.
A circle is composed of 360 degrees.
Also recall that a straight line measures 180 degrees.
Looking at the given clock, it is seen that a straight line can be created by connecting the 12 and 6 on the clock. Since the clock reads 11:35 the angle between the hour and minute hand is greater than 180 degrees because the hour hand is behind the 12 and the minute hand is behind the 6 on the clock.