Interim Engineering Intern applicants have rated the interview process at Qualcomm with 3.1 out of 5 (where 5 is the highest level of difficulty) and assessed their interview experience as 100% positive. To compare, the company-average is 62.5% positive. This is according to Glassdoor user ratings.
Candidates applying for Interim Engineering Intern roles take an average of 17 days to get hired, when considering 15 user submitted interviews for this role. To compare, the hiring process at Qualcomm overall takes an average of 22 days.
Common stages of the interview process at Qualcomm as a Interim Engineering Intern according to 15 Glassdoor interviews include:
Phone interview: 50%
Skills test: 17%
One on one interview: 11%
IQ intelligence test: 6%
Background check: 6%
Personality test: 6%
Drug test: 6%
Here are the most commonly searched roles for interview reports -
I applied through college or university. The process took 5 days. I interviewed at Qualcomm in Sep 2025
Interview
Qualcomm conducted an online assessment,then it shortlisted top 5 performers , the first round was technical ,it went around 50 min ,after 1st round 3 were selected for next round ,the next round was HR round,it went about 10min,2 were offered internship out of three.
I applied through college or university. The process took 1 day. I interviewed at Qualcomm (Bengaluru) in Jun 2025
Interview
I was given the opportunity via campus placement .They took a direct interview without any Online Assessment . There were 3 people and initially they asked me questions on the projects and internship that i had mentioned in my resume . Also there were basic/ medium level questions regarding ML , DL and NLP . Also some questions on data structure and a coding question to check my logical aptitude .
I had a single interview which lasted for 1 hour. The interview consisted of machine learning and probability questions. We also reviewed my CV and my research experience. Overall, the difficulty level was average.
Interview questions [1]
Question 1
How would you compute the variance of the random variable Y = AX when A is a matrix and X is a vector?