Tools You Can Make To Measure In the Playground



Measuring and Mapping The Playground

Tools You Can Make To Measure In the Playground

To measure distance: Stride Ruler

To measure angle: Pocket Protractor

To measure height: Handy Measuring Tool

Measurement Activities In the Playground

Mapping: Basketball Court, Baseball Diamond, Foursquare Court, Entire Playground

Angle Hunting

Finding the Height Of a Climbing Structure

Mapping the Playground

Playground courts and playing fields provide large-scale opportunities for integrating measurement, being outdoors, and scaling.

Part One: Measuring The Playground

Grades 3-5, 6-8

Materials:

Measurement tools (Stride Ruler this should be done ahead as separate activity.)

Playground courts and/or playing field

Paper and pencil

Try This:

1. Choose a playground court or playing field to measure (Four Square Courts are the simplest).

2. Draw a large rectangle or square (depending on what you have chosen to measure) on your paper to indicate the boundary of the court/field.

3. Measure the length and width of the court’s boundary, and label them on your paper. Be sure to use correct units. This boundary, the distance all the way around the court, is the perimeter.

4. On your paper, sketch at least four additional lines or shapes that are part of the court.

5. Measure these additional lines or shapes, and label them on your sketch.

6. If you have more time, add any additional court lines or shapes to your sketch. Measure these additional lines or shapes, and label them on your sketch.

7. Look for examples of geometric terms and shapes. Can you identify any right angles, parallel lines, perpendicular lines? Can you identify any squares, rectangles, circles, arcs, triangles?

Part Two: Making a Scaled Drawing Of the Playground

Grades 6-8

Materials:

Sketch from Part One

Pencil

Grid paper

Mathematical compass

Calculator

Ruler

Try This:

1. Choose an appropriate scale for your drawing. (Hint: Count the number of squares across the length of your grid paper, and compare that number to the longest measurement from your playground court sketch.) For example, if your paper has 50 squares across its length, and the length of the basketball court is 23 m long, let one squares equal .5 m. Write the scale factor you have chosen at the bottom of your grid paper.

2. Use your scale factor to determine the scaled length and width of the outer boundaries of the playground court you sketched.

23 m x 1 square = 46 squares

.5 m

3. Use your ruler to carefully draw the scaled perimeter of the playground court. Label these lengths and widths with their true measurements, not the scaled measurements. For example, the length of the basketball court on your scaled drawing should be labeled “23 m”.

4. Use your scale factor to determine the scaled lengths and widths of the other lines and shapes on your sketch.

5. Use your ruler to carefully draw these scaled lines and shapes.

6. Label all your lines and shapes with their true measurements.

Web Resources:

Basketball Court Details:



Angle Hunting

Grades 3-5, 6- 8

Materials:

Measurement tools (Pocket Protractor – this should be made ahead as a separate activity)

Playground structures

Paper and pencil

Try This:

1. Make sure all your angles are labeled on your Pocket Protractor.

2. On the playground, make a list of structures that have measurable angles. Without using a tool, can you identify right angles, angles with less than 90°, and angles with more than 90°?

3. To measure a structure’s angles, do the following: squarely face the object you are measuring. In other words, stand so that you are perpendicular to the plane of the angle, and not off to the side.

4. Hold the Pocket Protractor at arm’s length, close one eye, and try to fit one of the angles of your Pocket Protractor into the angle of the structure. You may need to fold or unfold your Pocket Protractor to find the best fitting angle. If none of the angles of the Pocket Protractor fit the angle you are measuring, come up with a reasonable estimate.

5. After you have measured an angle, record it on your list.

6. Try measuring the same angle from a different distance, making sure you are still squarely facing the object you are measuring. What do you notice?

7. Try to find examples of each angle on your Pocket Protractor.

8. If you have time, sketch the structures and label the angles you have measured.

What’s Going On?

You may have noticed that angle measurements don’t change with distance. Angle measurements are distance invariant.

Extension:

The Playground Patterns Of Cracks activity is another angle hunting opportunity. Because the Pocket Protractor can be placed on the ground to measure cracks in paved surfaces, the angles can be measured directly. This is an easier application of the Pocket Protractor.

Finding the Height of the Climbing Structure

This activity was developed by Dr. Linda Shore, Director of the Exploratorium Teacher Institute.

Grades 3-5, 6- 8

Materials:

Distance measuring tool (Stride Ruler)

Handy Measuring ratio, rounded to a simple fraction

Climbing Structure, or other tall object

Paper

Pencil

Try This:

1. Choose a Climbing Structure or other tall object to measure.

2. Walk toward or away from the object until its height can just be covered by your extended hand, held at arm's length. In other words, the tip of your thumb should “line up” with the top of the object, and the tip of your little finger should “line up” with the bottom of the object.

3. Mark this location on the ground with chalk or a stone or a stick.

4. Pace off distance to object, counting number of steps.

5. Determine the distance to the object by multiplying the number of steps times length of step.

6. Use the following proportion to determine the height of the object:

1 (height of hand) = Height of Object

3 (length of arm) Distance to Object

Recall that the 1/3 ratio expresses the relative height of your extended fingers to the length of your arm.

Please review “Handy Measuring Tool” activity for more information.

Since you know the Distance to Object (from Step 3), the missing information (Height of Object) will be a measurement three times smaller than the distance to it. Therefore, divide the Distance to Object by 3 to find the Height of Object indirectly.

What’s Going On?

We can use this simple ratio (1/3) to set up a proportion to help us find the height of a distant object indirectly. This Height/Distance ratio of 1/3 is fixed in this activity, and in order to just cover the height of an object measured in this way, you must stand three times further away from the object than it is tall.

So What?

Many of the numbers we use in science have never been measured directly – we only know them from indirect measurements. How far is it to the sun? What is the diameter of Saturn’s rings? These measurements and many others have never been measured directly. This activity helps students understand the validity of indirect measurements.

Finding the Height of the Climbing Structure

Here is a version suitable for younger students.

Grades K-2, 3-5

Materials:

Climbing Structure, or other tall object

A friend

Pencil

Meter stick, or measuring tape

Try This:

1. Choose a Climbing Structure or other tall object to measure.

2. Ask your friend to stand as close as possible to the object you want to measure.

3. Walk at least 30 steps away from the structure.

4. Turn around, facing your friend (and the structure).

5. Try to imagine another copy of your friend, standing on top of your friend. Is the climbing structure taller than “two friends tall”? Is the climbing structure taller than “three friends tall”?

6. Here’s a way to check: hold your pencil in your hand, with your elbow straight, extended toward your friend. Close one eye, and try to hold the pencil so that it looks like it is next to your friend. Move your hand to the place on the pencil so that a free end of the pencil looks like it’s the same height as your friend. Now you can use the pencil to see how many “friends tall” the structure is.

7. Use the meter stick or measuring tape to find out the height of your friend.

8. Multiply the height of your friend times the number of “friends tall” climbing structure is. The product will be the height of the climbing structure.

What’s Going On?

This activity provides a simpler method for finding the height of the tall object indirectly.

................
................

In order to avoid copyright disputes, this page is only a partial summary.

Google Online Preview   Download