How many hours a week should I study for FE?

How many hours a week should I study for FE?

Each week, plan on committing at least 10 to 15 hours on studying for the FE exam. That’s about 1 ½ to 2 hours each day. Your study time should consist of reviewing the reference book, working through a test prep course, and taking multiple practice tests.

How much is an Fe prep course?

Top 4 FE Exam Study Materials Comparison

PRICE From $990 Check Price
VIDEO LECTURES 80 Hours 16+ Hours
PASSING GUARANTEE Free Repeat Guarantee

What is the best way to prepare for the FE?

Preparing for the FE Exam

  1. Familiarize yourself with the “FE Reference Handbook” Every examinee is given the same reference to use during the FE exam.
  2. Take a practice exam. NCEES has practice exam books available on its website.
  3. Do practice problems.
  4. Know yourself.

What percentage of engineers take FE exam?

Pass rates

Exam Volume Pass rate
FE Civil 3768 62%
FE Electrical and Computer 815 73%
FE Environmental 470 70%
FE Industrial and Systems 116 62%

How many people pass the FE on their first try?

How Difficult Is The FE Exam? The first time pass rate across all disciplines is 71% and 35% for repeat exam takers.

What percentage do you need to pass the FE exam?

What score do I need to pass the FE-CBT Civil exam? The required score to pass this exam is not a set number used yearly. Typically, scoring an estimated 50% of the exam correctly will result in a curved passing score (70%). However, exact percentiles will vary from year to year.

Where can I study for the FE exam?

The 9 Best FE Exam Prep Services

Service Price Civil FE
PPI OnDemand $295
GA Tech Coursera Free
Marshall University FE Prep Free
YouTube and College Notes Free

How much is the FE exam?

A $175
The FE exam is a computer-based exam administered year-round at NCEES-approved Pearson VUE test centers. Learn more at the NCEES YouTube channel. A $175 exam fee is payable directly to NCEES.

Is the FE exam plug and chug?

About 50-60% of the exam is definitely just plug and chug type equations.