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\[ \text{Find } 2011^2 - 2010^2 \text{?} \]

Ask by Chan Mejia. in the United States
Jan 27,2025

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\( 2011^2 - 2010^2 = 4021 \)

Solución

To find \( 2011^2 - 2010^2 \), we can use the difference of squares formula: \[ a^2 - b^2 = (a + b)(a - b) \] Let \( a = 2011 \) and \( b = 2010 \). Applying the formula: \[ 2011^2 - 2010^2 = (2011 + 2010)(2011 - 2010) \] Calculate each part: \[ 2011 + 2010 = 4021 \] \[ 2011 - 2010 = 1 \] Multiply the results: \[ 4021 \times 1 = 4021 \] **Answer:** \( 4021 \)

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To find \( 2011^2 - 2010^2 \), you can use the difference of squares formula, which states that \( a^2 - b^2 = (a - b)(a + b) \). Here, let \( a = 2011 \) and \( b = 2010 \). First, calculate \( a - b \): \[ 2011 - 2010 = 1 \] Next, calculate \( a + b \): \[ 2011 + 2010 = 4021 \] Now applying the formula: \[ 2011^2 - 2010^2 = (2011 - 2010)(2011 + 2010) = 1 \times 4021 = 4021 \] So, \( 2011^2 - 2010^2 = 4021 \).

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