To understand the plot of the expression \(-1.5 + 4i\), we need to recognize its representation in the complex plane.
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Complex Plane: The complex plane is a two-dimensional plane where the x-axis represents the real part of a complex number and the y-axis represents the imaginary part.
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Coordinates: The expression \(-1.5 + 4i\) consists of a real part of \(-1.5\) and an imaginary part of \(4\). This means it can be plotted as the point \((-1.5, 4)\) in the complex plane.
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Location: Given this point, it is located in the second quadrant of the complex plane since the real part is negative and the imaginary part is positive.
Based on this information, you can say that:
- The point corresponding to \(-1.5 + 4i\) is located at coordinates \((-1.5, 4)\).
- It lies in the second quadrant of the complex plane.
These statements are true about the plot of the expression \(-1.5 + 4i\). If you have specific statements to evaluate, please provide those for further analysis.