Pregunta
ACT PREP The radius of a circle is \( x^{3}+7 x \) What is the diameter? \( 2 x^{3}+14 x \) \( 2 x^{3}+7 x \) \( 2 x^{3}+7 x+14 \) \( x^{3}+14 x \) \( x^{3}+7 x+21 \)
Ask by Santiago May. in the United States
Jan 22,2025
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The diameter is \( 2x^{3} + 14x \).
Solución
To find the diameter of the circle when the radius is given by \( x^{3} + 7x \), you can use the relationship between the radius and diameter:
\[
\text{Diameter} = 2 \times \text{Radius}
\]
Plugging in the given radius:
\[
\text{Diameter} = 2 \times (x^{3} + 7x) = 2x^{3} + 14x
\]
**Correct Answer:** \( 2x^{3} + 14x \)
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Simplifique esta solución The Deep Dive
To find the diameter of a circle, you simply double the radius. Given that the radius is \( x^{3}+7x \), the diameter would be \( 2 \times (x^{3}+7x) = 2x^{3}+14x \). So the correct answer is \( 2x^{3}+14x \)! Remember, knowing how to manipulate equations like this is crucial for the ACT, which tests not just mathematical skills but also your ability to apply concepts quickly. Practice makes perfect! Additionally, be sure to double-check your algebra with a quick review of multiplication rules. It's easy to slip up, especially when variables are involved! Look out for simple mistakes, like forgetting to distribute correctly or misplacing terms. Every point counts on the ACT!
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