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The expression factors to \( (4x - 7y)^2 \).
Solución
The given expression is:
\[ 16x^{2} - 56xy + 49y^{2} \]
To factor this quadratic expression, let's check if it is a perfect square trinomial. A perfect square trinomial has the form:
\[ (ax + by)^2 = a^2x^2 + 2abxy + b^2y^2 \]
Let's compare this with the given expression:
1. **First Term (\(a^2x^2\))**:
\(16x^2\) can be written as \((4x)^2\), so \(a = 4\).
2. **Last Term (\(b^2y^2\))**:
\(49y^2\) can be written as \((7y)^2\), so \(b = 7\).
3. **Middle Term (\(2abxy\))**:
Substituting \(a = 4\) and \(b = 7\) into \(2abxy\) gives:
\(2 \times 4 \times 7 \times xy = 56xy\).
However, the given middle term is \(-56xy\), which indicates that the binomial should have a negative sign.
Putting it all together:
\[ 16x^{2} - 56xy + 49y^{2} = (4x - 7y)^2 \]
**Final Factored Form:**
\[
(4x - 7y)^2
\]
Revisado y aprobado por el equipo de tutoría de UpStudy
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Simplifique esta solución Beyond the Answer
To factor the expression \( 16 x^{2}-56 x y+49 y^{2} \), we can first look for a perfect square trinomial. The first term \( 16x^2 \) can be written as \( (4x)^2 \), and the last term \( 49y^2 \) can be written as \( (7y)^2 \). The middle term \( -56xy \) fits the format of \( -2 \cdot (4x) \cdot (7y) \). Hence, we can express the entire trinomial as: \[ (4x - 7y)^2 \] So, the factoring gives us \( (4x - 7y)(4x - 7y) \) or simply \( (4x - 7y)^2 \). Nice, right? Factoring quadratics like this can sometimes feel like solving a puzzle!
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