The points (2, 5), (2, 10) and (6, 10) are the three vertices of a rectangle. Which of these could be the fourth vertex? 1 (2, 6) 2 (6,2) 3 (6,5) 4 (10, 10)
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.3. (6, 5) - This point, when combined with (2, 5), (2, 10), and (6, 10), does form a rectangle. It creates equal side lengths and right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.3. (6, 5) - This point, when combined with (2, 5), (2, 10), and (6, 10), does form a rectangle. It creates equal side lengths and right angles.4. (10, 10) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.3. (6, 5) - This point, when combined with (2, 5), (2, 10), and (6, 10), does form a rectangle. It creates equal side lengths and right angles.4. (10, 10) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.So, the correct answer is option 3: (6, 5).
Answers & Comments
Answer:
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.3. (6, 5) - This point, when combined with (2, 5), (2, 10), and (6, 10), does form a rectangle. It creates equal side lengths and right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.3. (6, 5) - This point, when combined with (2, 5), (2, 10), and (6, 10), does form a rectangle. It creates equal side lengths and right angles.4. (10, 10) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.
To determine which point could be the fourth vertex of the rectangle formed by the given points (2, 5), (2, 10), and (6, 10), we need to consider the properties of a rectangle.A rectangle has two pairs of opposite sides that are equal in length and four right angles. The opposite sides must be parallel to each other.Let's check the options:1. (2, 6) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.2. (6, 2) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.3. (6, 5) - This point, when combined with (2, 5), (2, 10), and (6, 10), does form a rectangle. It creates equal side lengths and right angles.4. (10, 10) - This point is not aligned with the existing points to form a rectangle. It does not create equal side lengths or right angles.So, the correct answer is option 3: (6, 5).