[
  {
    "Question": "What is a scale drawing?",
    "Answer": "A",
    "Explanation": "A scale drawing is a representation of an object or area that is proportionally reduced or enlarged compared to the actual size, using a specific scale factor.",
    "PictureURL": "",
    "OptionA": "A proportional representation of an object",
    "OptionB": "A drawing without any measurements",
    "OptionC": "A drawing that is only in 3D",
    "OptionD": "A drawing that uses random dimensions",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Understanding Scale Drawings",
    "Item": 1,
    "Type": "multiple choice",
    "Path": "geometry/scale_drawings"
  },
  {
    "Question": "If a scale drawing has a scale of 1:50, how many units in the drawing represent 50 units in real life?",
    "Answer": "B",
    "Explanation": "In a scale of 1:50, 1 unit in the drawing represents 50 units in real life. Therefore, 1 unit in the drawing corresponds to 50 units in reality.",
    "PictureURL": "",
    "OptionA": "1 unit",
    "OptionB": "50 units",
    "OptionC": "100 units",
    "OptionD": "25 units",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Understanding Scale Factors",
    "Item": 2,
    "Type": "multiple choice",
    "Path": "geometry/scale_factors"
  },
  {
    "Question": "What is the scale factor if a drawing is 3 cm long and the actual object is 12 cm long?",
    "Answer": "C",
    "Explanation": "The scale factor is calculated by dividing the drawing length by the actual length. Here, 3 cm / 12 cm = 1/4 or 1:4.",
    "PictureURL": "",
    "OptionA": "1:3",
    "OptionB": "1:2",
    "OptionC": "1:4",
    "OptionD": "4:1",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Calculating Scale Factors",
    "Item": 3,
    "Type": "multiple choice",
    "Path": "geometry/calculate_scale"
  },
  {
    "Question": "A map has a scale of 1:100,000. If two cities are 5 cm apart on the map, what is the actual distance between them?",
    "Answer": "D",
    "Explanation": "To find the actual distance, multiply the map distance by the scale factor. Here, 5 cm on the map represents 5 cm * 100,000 = 500,000 cm or 5 km.",
    "PictureURL": "",
    "OptionA": "500 m",
    "OptionB": "50 km",
    "OptionC": "500 km",
    "OptionD": "5 km",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Map Scale Calculations",
    "Item": 4,
    "Type": "multiple choice",
    "Path": "geometry/map_scale"
  },
  {
    "Question": "If a scale drawing is enlarged by a scale factor of 2, how does the area of the drawing change?",
    "Answer": "A",
    "Explanation": "When a drawing is enlarged by a scale factor, the area increases by the square of the scale factor. Thus, if the scale factor is 2, the area increases by 2^2 = 4 times.",
    "PictureURL": "",
    "OptionA": "Increases by 4 times",
    "OptionB": "Increases by 2 times",
    "OptionC": "Remains the same",
    "OptionD": "Decreases by 2 times",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Effects of Scale Factor on Area",
    "Item": 5,
    "Type": "multiple choice",
    "Path": "geometry/area_scale"
  },
  {
    "Question": "Which of the following is NOT a scale factor?",
    "Answer": "D",
    "Explanation": "A scale factor is a ratio that compares the dimensions of a drawing to the actual object. A negative number does not represent a valid scale factor.",
    "PictureURL": "",
    "OptionA": "1:2",
    "OptionB": "3:4",
    "OptionC": "5:1",
    "OptionD": "-2:1",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Identifying Scale Factors",
    "Item": 6,
    "Type": "multiple choice",
    "Path": "geometry/identify_scale"
  },
  {
    "Question": "A scale drawing of a room is made with a scale of 1:20. If the drawing shows the room as 4 m long, what is the actual length of the room?",
    "Answer": "B",
    "Explanation": "To find the actual length, multiply the drawing length by the scale factor. Here, 4 m * 20 = 80 m.",
    "PictureURL": "",
    "OptionA": "40 m",
    "OptionB": "80 m",
    "OptionC": "20 m",
    "OptionD": "60 m",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Calculating Actual Lengths",
    "Item": 7,
    "Type": "multiple choice",
    "Path": "geometry/actual_length"
  },
  {
    "Question": "If a drawing is made at a scale of 1:10, what does this mean?",
    "Answer": "A",
    "Explanation": "A scale of 1:10 means that 1 unit on the drawing represents 10 units in real life. It is a way to show the proportion between the drawing and the actual object.",
    "PictureURL": "",
    "OptionA": "1 unit in drawing = 10 units in real life",
    "OptionB": "1 unit in drawing = 1 unit in real life",
    "OptionC": "10 units in drawing = 1 unit in real life",
    "OptionD": "10 units in drawing = 10 units in real life",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Understanding Scale Representation",
    "Item": 8,
    "Type": "multiple choice",
    "Path": "geometry/scale_representation"
  },
  {
    "Question": "What is the purpose of using scale factors in drawings?",
    "Answer": "C",
    "Explanation": "Scale factors are used to create accurate representations of objects that may be too large or too small to draw at actual size, allowing for proportionality in design.",
    "PictureURL": "",
    "OptionA": "To make drawings look artistic",
    "OptionB": "To confuse the viewer",
    "OptionC": "To maintain proportionality",
    "OptionD": "To eliminate measurements",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Purpose of Scale Factors",
    "Item": 9,
    "Type": "multiple choice",
    "Path": "geometry/purpose_scale"
  },
  {
    "Question": "If a scale drawing is reduced by a scale factor of 1/3, how does the perimeter of the drawing change?",
    "Answer": "B",
    "Explanation": "When a drawing is reduced by a scale factor, the perimeter also decreases by the same factor. Thus, if the scale factor is 1/3, the perimeter will be 1/3 of the original.",
    "PictureURL": "",
    "OptionA": "Increases by 3 times",
    "OptionB": "Decreases by 1/3",
    "OptionC": "Remains the same",
    "OptionD": "Increases by 1/3",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Effects of Scale Factor on Perimeter",
    "Item": 10,
    "Type": "multiple choice",
    "Path": "geometry/perimeter_scale"
  },
  {
    "Question": "A drawing of a park is made with a scale of 1:500. If the drawing shows the park as 10 cm long, what is the actual length of the park?",
    "Answer": "D",
    "Explanation": "To find the actual length, multiply the drawing length by the scale factor. Here, 10 cm * 500 = 5000 cm or 50 m.",
    "PictureURL": "",
    "OptionA": "500 cm",
    "OptionB": "1000 cm",
    "OptionC": "2500 cm",
    "OptionD": "5000 cm",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Calculating Park Length",
    "Item": 11,
    "Type": "multiple choice",
    "Path": "geometry/park_length"
  },
  {
    "Question": "What happens to the dimensions of a shape when it is scaled by a factor of 1/2?",
    "Answer": "A",
    "Explanation": "When a shape is scaled by a factor of 1/2, all dimensions are halved, resulting in a smaller version of the original shape.",
    "PictureURL": "",
    "OptionA": "All dimensions are halved",
    "OptionB": "All dimensions are doubled",
    "OptionC": "Dimensions remain the same",
    "OptionD": "Dimensions are tripled",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Effects of Scaling on Dimensions",
    "Item": 12,
    "Type": "multiple choice",
    "Path": "geometry/scaling_dimensions"
  },
  {
    "Question": "If a scale drawing is made at a scale of 1:25, what does this imply about the size of the drawing compared to the actual object?",
    "Answer": "B",
    "Explanation": "A scale of 1:25 means that the drawing is smaller than the actual object, with 1 unit in the drawing representing 25 units in reality.",
    "PictureURL": "",
    "OptionA": "The drawing is larger than the actual object",
    "OptionB": "The drawing is smaller than the actual object",
    "OptionC": "The drawing is the same size as the actual object",
    "OptionD": "The drawing is twice the size of the actual object",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Understanding Size Relationships",
    "Item": 13,
    "Type": "multiple choice",
    "Path": "geometry/size_relationships"
  },
  {
    "Question": "Which of the following is an example of a scale drawing?",
    "Answer": "C",
    "Explanation": "A blueprint is a scale drawing that represents a building or structure at a reduced size, maintaining the proportions of the actual structure.",
    "PictureURL": "https://upload.wikimedia.org/wikipedia/commons/thumb/3/3c/Blueprint.svg/1200px-Blueprint.svg.png",
    "OptionA": "A photograph",
    "OptionB": "A sketch without measurements",
    "OptionC": "A blueprint of a building",
    "OptionD": "A random doodle",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Identifying Scale Drawings",
    "Item": 14,
    "Type": "multiple choice",
    "Path": "geometry/example_scale_drawing"
  },
  {
    "Question": "If a scale drawing is made at a scale of 1:5, how much larger is the actual object compared to the drawing?",
    "Answer": "D",
    "Explanation": "If the scale is 1:5, the actual object is 5 times larger than the drawing, meaning for every 1 unit in the drawing, there are 5 units in reality.",
    "PictureURL": "",
    "OptionA": "2 times larger",
    "OptionB": "3 times larger",
    "OptionC": "4 times larger",
    "OptionD": "5 times larger",
    "OptionE": "",
    "OptionF": "",
    "OptionG": "",
    "TestName": "Geometry - Scale Drawings and Scale Factors",
    "Content Type": "Practice Test",
    "Title": "Understanding Size Comparisons",
    "Item": 15,
    "Type": "multiple choice",
    "Path": "geometry/size_comparisons"
  }
]