y = 3(2)^2 - 12(2) + 15 = 12 - 24 + 15 = 3 - DNSFLEX
Understanding the Quadratic Equation: Simplifying y = 3(2)² – 12(2) + 15 Step by Step
Understanding the Quadratic Equation: Simplifying y = 3(2)² – 12(2) + 15 Step by Step
Solving quadratic equations is a foundational skill in algebra, and one that often causes confusion—even for experienced learners. In this article, we break down the equation:
y = 3(2)² – 12(2) + 15
and simplify it step by step to reveal why it finally simplifies to y = 3. Whether you're studying algebra, teacher, or self-learner, understanding how to evaluate and simplify expressions—especially quadratic forms—is essential for mastering more complex math concepts.
Understanding the Context
What Is the Given Equation?
Our starting equation is:
y = 3(2)² – 12(2) + 15
At first glance, this seems like a standard quadratic expression—but in this case, we’ll treat it like a linear evaluation problem since no variable “y” is isolated as the subject. But the challenge lies not in solving for a variable, but in correctly evaluating the expression using order of operations (PEMDAS/BODMAS).
Key Insights
Step 1: Apply the Exponent First
Because of the exponent (2) in (2)², we apply the P (Parentheses) rule in sequence with E (Exponents):
(2)² = 4
Now substitute:
y = 3 × 4 – 12 × 2 + 15
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Step 2: Perform Multiplication from Left to Right
Multiplication comes before addition and subtraction, per BODMAS/PEMDAS:
- First term: 3 × 4 = 12
- Second term: 12 × 2 = 24
Now substitute:
y = 12 – 24 + 15
Step 3: Evaluate from Left to Right (Addition and Subtraction)
We proceed left to right:
- 12 – 24 = –12
- Then: –12 + 15 = 3
Final Result:
y = 3
