\( \frac{x+3}{4}=2 x-1 \) and \( 3 x+2 y=15 \)

To solve the first equation \( \frac{x+3}{4}=2x-1 \), you can start by multiplying both sides by 4 to eliminate the fraction: \( x + 3 = 8x - 4 \). Next, move \( x \) to the right and the constant term (-4) to the left to get: \( 3 + 4 = 8x - x \) which simplifies to \( 7 = 7x \). Dividing both sides by 7 gives \( x = 1 \). Now substitute \( x = 1 \) into the second equation \( 3x + 2y = 15 \): \( 3(1) + 2y = 15 \), which yields \( 3 + 2y = 15 \). Subtract 3 from both sides, leading to \( 2y = 12 \), and then divide by 2 to get \( y = 6 \). So the solution is \( x = 1 \) and \( y = 6 \). In case you encounter fractions during algebra, don’t fret! Just remember that multiplying by the least common denominator (LCD) can help simplify and clear those pesky fractions quickly. Keep practicing, and you'll gain confidence in your problem-solving skills! If you want to delve deeper into solving systems of equations, consider exploring textbooks like "Algebra and Trigonometry" by Michael Sullivan, which often contain varied examples and exercises that can bolster your understanding and application of these concepts in real-life scenarios. Happy learning!