(2%2B7i).jpeg "(5-2i)(2+7i)")
Multiplying Complex Numbers: (5-2i)(2+7i)
This article will guide you through the multiplication of complex numbers, specifically the product of (5-2i) and (2+7i).
Understanding Complex Numbers
Complex numbers are expressed in the form a + bi, where 'a' and 'b' are real numbers, and 'i' is the imaginary unit, defined as the square root of -1 (i² = -1).
The Multiplication Process
To multiply complex numbers, we use the distributive property, similar to multiplying binomials:
-
FOIL Method: "First, Outer, Inner, Last"
- First: (5)(2) = 10
- Outer: (5)(7i) = 35i
- Inner: (-2i)(2) = -4i
- Last: (-2i)(7i) = -14i²
-
Simplify: Remember that i² = -1, so we substitute:
- 10 + 35i - 4i - 14(-1)
-
Combine Real and Imaginary Terms:
- (10 + 14) + (35 - 4)i
-
Final Result:
- 24 + 31i
Therefore, the product of (5-2i) and (2+7i) is 24 + 31i.
Key Points
- Complex Multiplication: The product of two complex numbers is also a complex number.
- FOIL Method: This method ensures that all terms are multiplied.
- Simplifying with i²: Remember to substitute i² with -1.
By following these steps, you can confidently multiply complex numbers and arrive at the correct answer.