Last visit was: 24 Apr 2026, 13:47 It is currently 24 Apr 2026, 13:47
Home
Messages
Tests
Schools
Events
Close
GMAT Club Daily Prep
Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.

Customized
for You

we will pick new questions that match your level based on your Timer History

Track
Your Progress

every week, we’ll send you an estimated GMAT score based on your performance

Practice
Pays

we will pick new questions that match your level based on your Timer History
Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.
Go to My Error Log Learn more
Close
Request Expert Reply
Confirm Cancel
Back to Forum
Create Topic
705-805 (Hard)|   Algebra|      
User avatar
Bunuel
User avatar
Math Expert
Joined: 02 Sep 2009
Last visit: 24 Apr 2026
Posts: 109,818
Own Kudos:
811,064
 [25]
Given Kudos: 105,873
Products:
GMAT Club Tests Forum Quiz
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
Posts: 109,818
Kudos: 811,064
 [25]
What is the product of all possible values of x for the equation 11 Jan 2022, 07:00
Kudos
Add Kudos
25
Bookmarks
Bookmark this Post
00:00
Start Timer
Pause Timer
Resume Timer
Show Answer
Hide
Show
History
B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

85% (hard)

Question Stats:

51% (02:03) correct 49% (02:09) wrong based on 158 sessions

History

Date
Time
Result
Not Attempted Yet
What is the product of all possible values of x for the equation \(4x^3 -23x^2 + 26x +8 = 0\)?

A. -4
B. -2
C. 1
D. 2
E. 4

Are You Up For the Challenge: 700 Level Questions
ShowHide Answer
Official Answer
B
Most Helpful Reply
avatar
TahaTT
avatar
Joined: 09 Oct 2021
Last visit: 29 Jan 2023
Posts: 3
Own Kudos:
9
 [5]
Given Kudos: 41
Location: India
Posts: 3
Kudos: 9
 [5]
What is the product of all possible values of x for the equation 20 Feb 2022, 10:55
4
Kudos
Add Kudos
1
Bookmarks
Bookmark this Post
Instead of the long calculation, could we simply use the formulas for the sum and product of roots of a polynomial?

Sum of roots = -b/a
Product of roots = z/a (if the degree of polynomial is even)
Product of roots = -z/a (if the degree of polynomial is odd)

Since this is a 3rd degree polynomial,
Product of roots = -z/a = -8/4 = -2
So the correct option is B.
General Discussion
User avatar
sujoykrdatta
User avatar
Joined: 26 Jun 2014
Last visit: 23 Apr 2026
Posts: 587
Own Kudos:
1,191
 [2]
Given Kudos: 14
Status:Mentor & Coach | GMAT Q51 | CAT 99.98
GMAT 1: 740 Q51 V39
Expert
Expert reply
GMAT 1: 740 Q51 V39
Posts: 587
Kudos: 1,191
 [2]
What is the product of all possible values of x for the equation 11 Jan 2022, 09:27
1
Kudos
Add Kudos
1
Bookmarks
Bookmark this Post
Bunuel
What is the product of all possible values of x for the equation \(4x^3 -23x^2 + 26x +8 = 0\)?

A. -4
B. -2
C. 1
D. 2
E. 4

Are You Up For the Challenge: 700 Level Questions
Show more


Let the roots of the equation be p, q, r and s
Thus, we can write:

\(4x^3 -23x^2 + 26x +8 = 4(x - p)(x - q)(x - r)(x - s)\)

Thus, comparing the constant term on both sides, we get:

\(8 = 4(-p)(-q)(-r)(-s)\)

\(=> 8 = 4pqrs\)

\(=> pqrs = 2\)

Thus, the product of the roots = 2

Answer D
avatar
randarth
avatar
Joined: 21 Mar 2020
Last visit: 24 Jul 2022
Posts: 19
Own Kudos:
6
 [2]
Given Kudos: 27
Posts: 19
Kudos: 6
 [2]
What is the product of all possible values of x for the equation 12 Jan 2022, 03:02
2
Kudos
Add Kudos
Bookmarks
Bookmark this Post
sujoykrdatta
Bunuel
What is the product of all possible values of x for the equation \(4x^3 -23x^2 + 26x +8 = 0\)?

A. -4
B. -2
C. 1
D. 2
E. 4

Are You Up For the Challenge: 700 Level Questions


Let the roots of the equation be p, q, r and s
Thus, we can write:

\(4x^3 -23x^2 + 26x +8 = 4(x - p)(x - q)(x - r)(x - s)\)

Thus, comparing the constant term on both sides, we get:

\(8 = 4(-p)(-q)(-r)(-s)\)

\(=> 8 = 4pqrs\)

\(=> pqrs = 2\)

Thus, the product of the roots = 2

Answer D
Show more

It is a cubic equation. Only three roots possible.


Let the roots of the equation be p, q, and r
Thus, we can write:

\(4x^3 -23x^2 + 26x +8 = 4(x - p)(x - q)(x - r)\)

Thus, comparing the constant term on both sides, we get:

\(8 = 4(-p)(-q)(-r)\)

\(=> 8 = -4pqr\)

\(=> pqr = -2\)

Thus, the product of the roots = -2
User avatar
GMATGuruNY
User avatar
Joined: 04 Aug 2010
Last visit: 02 Apr 2026
Posts: 1,347
Own Kudos:
3,905
 [2]
Given Kudos: 9
Schools:Dartmouth College
Expert
Expert reply
Posts: 1,347
Kudos: 3,905
 [2]
What is the product of all possible values of x for the equation Updated on: 20 Feb 2022, 14:12
Originally posted by GMATGuruNY on 12 Jan 2022, 05:46.
Last edited by GMATGuruNY on 20 Feb 2022, 14:12, edited 1 time in total.
2
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel
What is the product of all possible values of x for the equation \(4x^3 -23x^2 + 26x +8 = 0\)?

A. -4
B. -2
C. 1
D. 2
E. 4
Show more

Since the last term is 8, one of the roots is probably a factor of 8:
1, 2, 4, 8

When we test x=2, we get:
\(4x^3 -23x^2 + 26x + 8 = (4*2^3) - (23*2^2) + (26*2) + 8 = 32 - 92 + 52 + 8 = 0\)
Implication:
(x-2) is a factor of \(4x^3 -23x^2 + 26x + 8\)

Dividing x-2 into \(4x^3 -23x^2 + 26x + 8\), we get:
Attachment:
poly 4.png
poly 4.png [ 127.45 KiB | Viewed 4894 times ]

Factoring \(4x^2 - 15x - 4 = 0\), we get:
(4x+1)(x-4) = 0

Thus:
\(4x^3 -23x^2 + 26x + 8 = (x-2)(4x+1)(x-4)\)
Roots = 2, -1/4, 4
Product of the roots = \(= 2*-\frac{1}{4}*4 = -2\)

Show Spoiler
B
User avatar
Anvesh99
User avatar
Joined: 30 May 2021
Last visit: 08 Oct 2025
Posts: 19
Own Kudos:
8
 [1]
Given Kudos: 90
Posts: 19
Kudos: 8
 [1]
What is the product of all possible values of x for the equation 08 May 2022, 03:49
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
sujoykrdatta
Bunuel
What is the product of all possible values of x for the equation \(4x^3 -23x^2 + 26x +8 = 0\)?

A. -4
B. -2
C. 1
D. 2
E. 4


Let the roots of the equation be p, q, r and s
Thus, we can write:

\(4x^3 -23x^2 + 26x +8 = 4(x - p)(x - q)(x - r)(x - s)\)

Thus, comparing the constant term on both sides, we get:

\(8 = 4(-p)(-q)(-r)(-s)\)

\(=> 8 = 4pqrs\)

\(=> pqrs = 2\)

Thus, the product of the roots = 2

Answer D
Show more


Hello sujoykrdatta,

Can you please help me understand the question as well as your approach for this question. I am unable to understand.

Thanks
User avatar
NirupaD
User avatar
Joined: 15 Oct 2019
Last visit: 11 Jul 2024
Posts: 69
Own Kudos:
50
 [3]
Given Kudos: 81
Products:
My Reviews
Posts: 69
Kudos: 50
 [3]
What is the product of all possible values of x for the equation 10 May 2022, 05:31
2
Kudos
Add Kudos
1
Bookmarks
Bookmark this Post
Anvesh99
sujoykrdatta
Bunuel
What is the product of all possible values of x for the equation \(4x^3 -23x^2 + 26x +8 = 0\)?

A. -4
B. -2
C. 1
D. 2
E. 4


Let the roots of the equation be p, q, r and s
Thus, we can write:

\(4x^3 -23x^2 + 26x +8 = 4(x - p)(x - q)(x - r)(x - s)\)

Thus, comparing the constant term on both sides, we get:

\(8 = 4(-p)(-q)(-r)(-s)\)

\(=> 8 = 4pqrs\)

\(=> pqrs = 2\)

Thus, the product of the roots = 2

Answer D


Hello sujoykrdatta,

Can you please help me understand the question as well as your approach for this question. I am unable to understand.

Thanks
Show more

General Polynomial
\(f(x) = ax^n + bx^(n-1) + cx^(n-2) + ... + z\)

And then factor it like this:

f(x) = a(x−p)(x−q)(x−r)...

Then p, q, r, etc are the roots (where the polynomial equals zero)

Adding the roots gives −b/a
Multiplying the roots gives:
z/a (for even degree polynomials like quadratics)
−z/a (for odd degree polynomials like cubics)

Cubic
Now let us look at a Cubic (one degree higher than Quadratic):

\(ax^3 + bx^2 + cx + d\)

As with the Quadratic, let us expand the factors:

a(x−p)(x−q)(x−r)
= \(ax^3 − a(p+q+r)x^2 + a(pq+pr+qr)x − a(pqr)\)

And we get:

Cubic: \(ax^3 +bx^2 +cx +d\)
Expanded Factors: \(a^3 −a(p+q+r)x^2 +a(pq+pr+qr)x −apqr\)
We can now see that\( −a(p+q+r)x^2 = bx^2, \)so:

−a(p+q+r) = b
p+q+r = −b/a
And −apqr = d, so:

pqr = −d/a

Adding the roots gives −b/a (exactly the same as the Quadratic)
Multiplying the roots gives −d/a (similar to +c/a for the Quadratic)
(We also get pq+pr+qr = c/a, which can itself be useful.)

Higher Polynomials
The same pattern continues with higher polynomials.

In General:

Adding the roots gives −b/a
Multiplying the roots gives (where "z" is the constant at the end):
z/a (for even degree polynomials like quadratics)
−z/a (for odd degree polynomials like cubics)
User avatar
bumpbot
User avatar
Non-Human User
Joined: 09 Sep 2013
Last visit: 04 Jan 2021
Posts: 38,974
Own Kudos:
1,117
Posts: 38,974
Kudos: 1,117
What is the product of all possible values of x for the equation 13 Feb 2026, 13:48
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Automated notice from GMAT Club BumpBot:

A member just gave Kudos to this thread, showing it’s still useful. I’ve bumped it to the top so more people can benefit. Feel free to add your own questions or solutions.

This post was generated automatically.
Moderators:
Bunuel
Math Expert
109818 posts
Krunaal
Tuck School Moderator
853 posts