Determine the expanded form of the equation: $(5 x-6)(3 x-5)$
Solution
Step 1 :Given the equation \((5x - 6)(3x - 5)\).
Step 2 :We need to expand this equation by applying the distributive property of multiplication over addition.
Step 3 :First, distribute the first term of the first binomial \(5x\) to the terms in the second binomial \(3x - 5\). This gives us \(15x^2 - 25x\).
Step 4 :Next, distribute the second term of the first binomial \(-6\) to the terms in the second binomial \(3x - 5\). This gives us \(-18x + 30\).
Step 5 :Combine the results of the distributions to get the expanded form of the equation: \(15x^2 - 25x - 18x + 30\).
Step 6 :Simplify the equation by combining like terms to get \(15x^2 - 43x + 30\).
Step 7 :Final Answer: The expanded form of the equation \((5x - 6)(3x - 5)\) is \(\boxed{15x^2 - 43x + 30}\).
