y = 2\left(\frac23\right) + 3 = \frac43 + 3 = \frac43 + \frac93 = \frac133 - Crosslake

Understanding the Context

Breaking Down the Equation: y = 2×(2/3) + 3

At first glance, the equation appears simple, but careful attention reveals key algebraic and fraction-handling principles.

Start with:
y = 2 × (2/3) + 3

Step 1: Multiply 2 by 2/3
When multiplying, multiply the numerator:
2 × (2/3) = (2 × 2)/3 = 4/3

Key Insights

Step 2: Rewrite the equation
Now substitute back:
y = 4/3 + 3

Step 3: Express 3 as a fraction with denominator 3
To add, convert 3 into a fraction:
3 = 3/1 = 9/3 (since 3 × 3 = 9)

So now:
y = 4/3 + 9/3

Step 4: Add the fractions
Both terms now share the same denominator:
(4 + 9)/3 = 13/3

Final Thoughts

Final Result

y = 13/3
This improper fraction equals approximately 4.33 when converted to a decimal.

Why Fraction Conversion Matters in Math

Understanding how to work with fractions—whether converting them to decimals, simplifying expressions, or finding common denominators—is essential across mathematics education. Equations like y = 2×(2/3) + 3 form the building blocks for more complex topics such as algebra, calculus, and real-world problem solving.

Displaying answers as fractions or improper forms like 13/3 preserves precision and supports deeper understanding. Additionally, mastering these calculations improves numerical literacy, which is critical for standardized tests, engineering, science, and everyday decision-making involving ratios and proportions.