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Questions Asked

FoolForMath:
Fool's problem of the day,
A father wishes to distribute \( \$1400\) among this three sons such that the eldest one gets the maximum amou…
 updated one year ago
 9 replies
 4 Medals
Mathematics

FoolForMath:
Fools problem of the day,
\((1) \) Find the minimum value of \(\tan^2 A +\tan^2 B+\tan^2 C\), given that \(\tan A +\tan B+\tan C = 4 \)…
 updated 2 years ago
 11 replies
 4 Medals
Mathematics

FoolForMath:
Just another cute problem:
Find the range of \(x\) for which \( \arccos \sqrt{x1} \arcsin \sqrt{2x} =0 \) holds.
 updated one year ago
 9 replies
 2 Medals
Mathematics

FoolForMath:
Just another cute problem,
Prove that: \( \large \tan \frac \pi {16} + 2 \tan \frac \pi {8} + 4 = \cot \frac{\pi}{16} \)…
 updated 2 years ago
 15 replies
 7 Medals
Mathematics

FoolForMath:
\[ \huge\mathsf{\color{red}{\text{F}}}\mathsf{\color{turquoise}{\textbf{o}}}\mathsf{\color{orange}{\text{o}}}\mathsf{\color{yellowgreen}{\te…
 updated 2 years ago
 16 replies
 1 Medal
Mathematics

FoolForMath:
Fool's problem of the day,
\((1)\) There are \( N \) equidistant light poles around a circular garden. If every three light poles which for…
 updated 2 years ago
 21 replies
 1 Medal
Mathematics

FoolForMath:
Fool's problem of the day,
There are \( N \) equidistant light poles around a circular garden. If every three light poles which form either…
 updated one year ago
 No Medals Yet
Mathematics

FoolForMath:
Fool's (speed) problem of the day:
Can you do this under three minutes?…
 updated 2 years ago
 34 replies
 1 Medal
Mathematics

FoolForMath:
Albeit elementary, yet another cute integral,
\[\text{ Evaluate: } \large \int \limits_0 ^{\frac 32} \lfloor x^2 \rfloor \; dx\]
 updated 2 years ago
 23 replies
 6 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
A Combinatorial problem,…
 updated 2 years ago
 9 replies
 5 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Two crispy Arithmetic problems,…
 updated 2 years ago
 12 replies
 5 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Today a very easy trigonometry problem,…
 updated 2 years ago
 48 replies
 5 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Today, it's a cute number theory problem,…
 updated 2 years ago
 16 replies
 7 Medals
Mathematics

FoolForMath:
Previously,
http://openstudy.com/study#/updates/4f83fe86e4b0505bf084b9ce
…
 updated 2 years ago
 20 replies
 11 Medals
Mathematics

FoolForMath:
Fool's problem of the day!
A Fascinating counting problem,…
 updated 2 years ago
 81 replies
 9 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Wonderful Integrals:…
 updated 2 years ago
 27 replies
 11 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
(1) Find the periodicity of \( sec(p \theta ) \csc(q \theta ) \) where \(p\) and \(q\) are rationals?
 updated 2 years ago
 6 replies
 4 Medals
Mathematics

FoolForMath:
Fool's problem of the day:
There are two ants on opposite corners of a cube. On each move, they can travel along an edge to an adjacent ver…
 updated one year ago
 39 replies
 10 Medals
Mathematics

FoolForMath:
Fool's problem of the day (Run down memory lane)
After the successful completion of the today's problem, I thought of posting five of the…
 updated 2 years ago
 67 replies
 18 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Just one easy Arithmetic problem,…
 updated 2 years ago
 31 replies
 12 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
A function \( f \) is defined such that \( f(2) = 60 \) and \( \sum \limits_{i=1} ^n (1)^i f(i) = nf(n) \foral…
 updated 2 years ago
 20 replies
 11 Medals
Mathematics

FoolForMath:
Private Message is slower than Testimonial
I am facing some issues while sending private messages. It's slow and sometime it's taking an …
 updated 2 years ago
 5 replies
 3 Medals
Mathematics

FoolForMath:
Just another analytic geometry problem,
Find the locus of the point of intersection of the three normals to the parabola \( y^2=4ax\), to o…
 updated 2 years ago
 63 replies
 5 Medals
Mathematics

FoolForMath:
The site is lagging, loosing connection now and then. Please do the needful.
 updated 2 years ago
 1 reply
 2 Medals
Mathematics

FoolForMath:
Fool's problems of the day,
Today's problems are based on standard analytic geometry,…
 updated 2 years ago
 30 replies
 8 Medals
Mathematics

FoolForMath:
Fool's problems of the day,
[** EDIT: Complimentary problem added **]…
 updated 2 years ago
 81 replies
 13 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Today's problem of the day is based on arithmetic.…
 updated 2 years ago
 21 replies
 8 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Today's problems are to find the next term(s) of some given series…
 updated 2 years ago
 65 replies
 14 Medals
Mathematics

FoolForMath:
Just another (well known) riddle, for fun:
1…
 updated 2 years ago
 12 replies
 7 Medals
Mathematics

FoolForMath:
Fool's problem of the day,
Four identical dice are tossed simultaneously. What is the probability that at least three of the four nos. sh…
 updated 2 years ago
 42 replies
 12 Medals
Mathematics
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