\(p\) is the smallest perfect cube greater than \(1\) such that the difference between the tens digit of \(p^2\) and the

BREAKING: Target Test Prep releases Brand New 2026 On Demand GMAT prep course

Redeem

This topic has expert replies

Post new topic Post Reply

Previous Topic Next Topic

Gmat_mission: Legendary Member; Posts: 1622; Joined: Thu Mar 01, 2018 7:22 am; Followed by:2 members

\(p\) is the smallest perfect cube greater than \(1\) such that the difference between the tens digit of \(p^2\) and the

by Gmat_mission » Sun Mar 14, 2021 5:41 am

Timer

00:00

Your Answer

Global Stats

\(p\) is the smallest perfect cube greater than \(1\) such that the difference between the tens digit of \(p^2\) and the unit digit of \(p^2\) is \(2.\) If \(Z=1\cdot 2\cdot 3 \cdots p,\) then the total number of factors of \(Z\) is

A. 5
B. 8
C. 14
D. 96
E. 192

Answer: D

Source: e-GMAT