Solve for ( r ): ( r = rac{31.4}{2\pi} = 5 , \ ext{meters} ) – Simplifying a Key Formula

Understanding circular geometry is essential in science, engineering, and everyday measurements. One frequently encountered equation involves calculating the radius ( r ) of a circle when the circumference ( C ) is known. In this article, we explore how ( r = rac{31.4}{2\pi} = 5 , \ ext{meters} ) is derived and why this formula matters in real-world applications.

The Basic Formula for Circumference

Understanding the Context

The formula for the circumference ( C ) of a circle is given by:
[ C = 2\pi r ]
where:
- ( C ) is the circumference,
- ( \pi ) (pi) is a mathematical constant approximately equal to 3.14,
- ( r ) is the radius, the distance from the center of the circle to its outer edge.

Rearranging this equation to solve for ( r ), we get:
[ r = rac{C}{2\pi} ]

This rearrangement allows us to calculate the radius when the circumference is known—partically useful when working with circular objects or structures.

Plugging in the Numbers

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[ANSWERED] Solve r r 2 5 2r 11 7... - Algebra - Kunduz
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Key Insights

Given ( C = 31.4 , \ ext{meters} ), substitute into the rearranged formula:
[ r = rac{31.4}{2\pi} ]

Using ( \pi pprox 3.14 ):
[ r = rac{31.4}{2 \ imes 3.14} = rac{31.4}{6.28} = 5 , \ ext{meters} ]

This confirms that ( r = 5 , \ ext{meters} ), offering a precise and simple way to determine the radius from the circumference.

Why This Calculation Matters

This formula is widely applied across disciplines:

Continue Reading

Then, \( A = 3.14 \times 49 \).
Calculate \( A \approx 153.86 \).
A quadratic equation \( ax^2 + bx + c = 0 \) has roots 3 and -5. If \( a = 2 \), what is the value of \( b \)?

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Final Thoughts

  • Construction and architecture: Determining circular foundations, columns, or domes.
    - Manufacturing: Designing round gears, pipes, and mechanical components.
    - Earth sciences: Estimating the radius of circular craters, ponds, or storm systems.
    - Education: Teaching fundamental principles of geometry and trigonometry.

Understanding how to solve for ( r ) using the circumference formula empowers accurate measurement and problem solving in practical situations.

Step-by-Step Breakdown

To simplify the calculation:
1. Start with ( r = rac{C}{2\pi} ).
2. Substitute ( C = 31.4 ) and ( \pi pprox 3.14 ):
[ r = rac{31.4}{2 \ imes 3.14} ]
3. Multiply the denominator: ( 2 \ imes 3.14 = 6.28 ).
4. Divide:
[ r = rac{31.4}{6.28} = 5 ]
Thus, ( r = 5 , \ ext{meters} ).

This straightforward calculation demonstrates how mathematical constants combine to decode real-world measurements efficiently.

Final Thoughts

Solving for ( r ) in ( r = rac{31.4}{2\pi} ) yields ( r = 5 , \ ext{meters} ) when the circumference is 31.4 meters and ( \pi ) is approximated at 3.14. This elegant formula underpins numerous practical applications and reinforces foundational math skills. Whether in classroom learning, technical fields, or daily tasks like DIY projects, mastering this calculation supports precise and confident decision-making.

Understanding such equations enriches problem-solving capability and deepens appreciation for the role of mathematics in interpreting the physical world.