Precalculus can be one of the most difficult courses you will take in college, but with a little practice, you can succeed. Here are a few tips that will help you navigate the subject and get to the end of class with your head held high. You need to understand each topic, chapter and unit in order to succeed in precalculus. This means reading the textbook, doing the homework, asking questions in class and getting extra tutoring if needed. You also need to practice doing problems outside of the ones that your teacher gives you.

This will help you see how the concepts apply to real-life situations. It will also allow you to find shortcuts that your teacher might not have taught.

### Study Technique #2: Practice Problems.

Doing problems is an essential part of success in every academic endeavor. It is particularly important for precalculus because of the fast pace and often-complex nature of the course.

For example, when you are learning about functions, if you don’t solve for a variable you will never learn how to use the function. In addition, students who do not solve for a variable often get stuck when trying to solve for another.

A great way to practice solving problems is to use a graphing calculator. Using this tool will make the concepts of functions much easier to understand because you can see how they relate to each other and to real-world problems.

### Study Technique #3: Give Yourself Additional Homework.

Even if your teacher only gave you a few problems to work on, don’t be afraid to give yourself more. This is especially important if you have struggled with a certain topic in the past.

The best place to look for extra problems is in your textbook and online. You can find a wide variety of sites that offer free homework sets that will help you review and practice what you are learning in class.

This will help you remember the content and make sure that you are able to answer all of your questions correctly. It will also help you prepare for the tests that are required to pass the course.

### Study Technique #4: Get a Calculator.

The most common and easiest way to solve equations is to simply multiply the two numbers together. This is very basic and is the first step in many algebraic processes, such as finding solutions to complex equations and solving systems of equations.

However, this process does not always work out the way it should. In addition to solving equations, you will be asked to solve quadratic and exponential equations in precalculus, as well as finding the roots of polynomials. This can be tricky because you have to remember how the variables are related to each other and their roots.

For this reason, it is recommended that you get a graphing calculator and take advantage of the ALEKS Preparation Courses Bethel offers to review and practice the skills needed for the course.

In conclusion, excelling in Precalculus requires effective study techniques that can help students navigate the challenging course material. By implementing the following strategies, students can increase their chances of success:

Study Technique #1: Reading the textbook, actively participating in class, asking questions, and seeking additional tutoring support can enhance understanding and ensure a strong foundation in each topic.

Study Technique #2: Regularly practicing problems is crucial for mastering the fast-paced and complex nature of Precalculus. Utilizing a graphing calculator can aid in visualizing functions and their real-world applications.

Study Technique #3: Going beyond assigned homework and creating additional practice sets, using resources like textbooks and online platforms, can reinforce learning, improve retention, and prepare for assessments.

Study Technique #4: Having a graphing calculator can assist in solving equations, including quadratic, exponential, and polynomial equations, as well as understanding the relationships between variables and their roots.

Additionally, taking advantage of ALEKS Preparation Courses or similar resources can provide structured review and practice opportunities tailored to the requirements of Precalculus.

By implementing these study techniques and maintaining a consistent and disciplined approach to learning, students can overcome the challenges posed by Precalculus. With practice, perseverance, and the utilization of available resources, students can succeed in the course and develop a strong mathematical foundation for future academic pursuits.