In this task, you are given a context, a subject, a relation, and many options. Based on the context, from the options select the object entity that has the given relation with the subject. Answer with text (not indexes).

[EX Q]: Context: The Jackson 5, or Jackson Five, also known as The Jacksons in later years, is an American popular music group. Formed in 1964 under the name the Jackson Brothers, the founding members were Jackie, Tito, Jermaine, Marlon and Michael. After participating in talent shows and the chitlin' circuit, they entered the professional music scene in 1967, signing with Steeltown Records and releasing two singles with the Steeltown label. In 1969, the group left Steeltown Records and signed with Motown., Falsetto (Italian diminutive of "falso", "false") is the vocal register occupying the frequency range just above the modal voice register and overlapping with it by approximately one octave., Eric Howard Carmen (born August 11, 1949) is an American singer, songwriter, guitarist and keyboardist. He scored numerous hit songs across the 1970s and 1980s, first as a member of the Raspberries (who had a million-selling single with "Go All the Way"), and then with his solo career, including hits such as "All by Myself," "Never Gonna Fall in Love Again," "She Did It," "Hungry Eyes," and "Make Me Lose Control.", "All by Myself" is a power ballad by American artist Eric Carmen released in 1975. The verse is based on the second movement ("Adagio sostenuto") of Sergei Rachmaninoff's "Piano Concerto No. 2 in C minor", Opus 18. The chorus is borrowed from the song "Let's Pretend", which Carmen wrote and recorded with the Raspberries in 1972., 3T is an American R&B/pop music group featuring the three sons of Tito Jackson (from The Jackson 5) and Delores "Dee Dee" Jackson. The band members include, from eldest, Tariano Adaryll Jackson II (also known as Taj), Taryll Adren Jackson and Tito Joe Jackson (also known as TJ)., "She Did It" is a song written and originally recorded by Eric Carmen in 1977. Carmen's single was a Top 40 hit on the "Billboard" Hot 100 chart, reaching number 23. "She Did It" was covered in 1981 by actor and singer Michael Damian, who reached number 69 on the Hot 100 with his version. , Toriano Adaryll "Tito" Jackson (born October 15, 1953) is an American singer and guitarist and original member of The Jackson 5 and The Jacksons, who rose to fame in the late 1960s with the Motown label, later finding success under the Epic label in the 1970s and 1980s. He is the third child in the Jackson family., Frankie Valli (born Francesco Stephen Castelluccio; May 3, 1934) is an American singer, known as the frontman of The Four Seasons beginning in 1960. He is known for his unusually powerful falsetto voice., `` I Need You '' is a song by American music group 3T , from the album Brotherhood . The song was written by Eric Carmen and was originally released in 1977 by Frankie Valli , on the album Lady Put The Light Out . Later it was released by the Euclid Beach Band . 3T 's cover version was released in 1996 , and had a very good performance in the European charts . It was never released in the U.S. Michael Jackson , their uncle , provides background vocals , so is sometimes credited as a featured artist ., "Hungry Eyes" is a song performed by American artist Eric Carmen, a former member of the band Raspberries, and was featured in the film "Dirty Dancing". The song was recorded at Beachwood Studios in Beachwood, Ohio in 1987. "Hungry Eyes" peaked at #4 on the "Billboard" Hot 100 chart and #3 on the "Cash Box" Top 100 in 1988. The song was not released commercially in the UK, but it managed to peak at #82 in January 1988, having charted purely on import sales. , Subject: i need you , Relation: instance_of, Options: (A) august (B) ballad (C) band (D) child (E) concerto (F) diminutive (G) epic (H) family (I) film (J) five (K) frequency (L) january (M) may (N) member (O) music (P) name (Q) october (R) pop (S) professional (T) range (U) single (V) song (W) three
[EX A]: single

[EX Q]: Context: Latin (Latin: ) is a classical language belonging to the Italic branch of the Indo-European languages. The Latin alphabet is derived from the Etruscan and Greek alphabets., In mathematics, a rational number is any number that can be expressed as the quotient or fraction "p"/"q" of two integers, a numerator "p" and a non-zero denominator "q". Since "q" may be equal to 1, every integer is a rational number. The set of all rational numbers, often referred to as "the rationals", is usually denoted by a boldface Q (or blackboard bold formula_1, Unicode ); it was thus denoted in 1895 by Giuseppe Peano after "quoziente", Italian for "quotient"., In number theory, integer factorization is the decomposition of a composite number into a product of smaller integers. If these integers are further restricted to prime numbers, the process is called prime factorization., A primality test is an algorithm for determining whether an input number is prime. Among other fields of mathematics, it is used for cryptography. Unlike integer factorization, primality tests do not generally give prime factors, only stating whether the input number is prime or not. Factorization is thought to be a computationally difficult problem, whereas primality testing is comparatively easy (its running time is polynomial in the size of the input). Some primality tests "prove" that a number is prime, while others like MillerRabin prove that a number is composite. Therefore, the latter might be called "compositeness tests" instead of primality tests., Number theory or, in older usage, arithmetic is a branch of pure mathematics devoted primarily to the study of the integers. It is sometimes called "The Queen of Mathematics" because of its foundational place in the discipline. Number theorists study prime numbers as well as the properties of objects made out of integers (e.g., rational numbers) or defined as generalizations of the integers (e.g., algebraic integers)., A prime number (or a prime) is a natural number greater than 1 that has no positive divisors other than 1 and itself. A natural number greater than 1 that is not a prime number is called a composite number. For example, 5 is prime because 1 and 5 are its only positive integer factors, whereas 6 is composite because it has the divisors 2 and 3 in addition to 1 and 6. The fundamental theorem of arithmetic establishes the central role of primes in number theory: any integer greater than 1 can be expressed as a product of primes that is unique up to ordering. The uniqueness in this theorem requires excluding 1 as a prime because one can include arbitrarily many instances of 1 in any factorization, e.g., 3, 1 · 3, 1 · 1 · 3, etc. are all valid factorizations of 3., Paul Leyland is a British number theorist who has studied integer factorization and primality testing., Broadly speaking, pure mathematics is mathematics that studies entirely abstract concepts. This was a recognizable category of mathematical activity from the 19th century onwards, at variance with the trend towards meeting the needs of navigation, astronomy, physics, economics, engineering, and so on., In number theory , a Leyland number is a number of the form x ^ y + y ^ x where x and y are integers greater than 1 . They are named after the mathematician Paul Leyland . The first few Leyland numbers are 8 , 17 , 32 , 54 , 57 , 100 , 145 , 177 , 320 , 368 , 512 , 593 , 945 , 1124 ( sequence A076980 in OEIS ) . The requirement that x and y both be greater than 1 is important , since without it every positive integer would be a Leyland number of the form x1 + 1x . Also , because of the commutative property of addition , the condition x  y is usually added to avoid double - covering the set of Leyland numbers ( so we have 1 < y  x ) . The first prime Leyland numbers are 17 , 593 , 32993 , 2097593 , 8589935681 , 59604644783353249 , 523347633027360537213687137 , 43143988327398957279342419750374600193 ( A094133 ) corresponding to 32 +23 , 92 +29 , 152 +215 , 212 +221 , 332 +233 , 245 +524 , 563 +356 , 3215 +1532 . One can also fix the value of y and consider the sequence of x values that gives Leyland primes , for example x2 + 2x is prime for x = 3 , 9 , 15 , 21 , 33 , 2007 , 2127 , 3759 , ... ( A064539 ) . By November 2012 , the largest Leyland number that had been proven to be prime was 51226753 + 67535122 with 25050 digits . From January 2011 to April 2011 , it was the largest prime whose primality was proved by elliptic curve primality proving . In December 2012 , this was improved by proving the primality of the two numbers 311063 + 633110 ( 5596 digits ) and 86562929 + 29298656 ( 30008 digits ) , the latter of which surpassed the previous record . There are many larger known probable primes such as 3147389 + 9314738 , but it is hard to prove primality of large Leyland numbers . Paul Leyland writes on his website : `` More recently still , it was realized that numbers of this form are ideal test cases for general purpose primality proving programs . They have a simple algebraic description but no obvious cyclotomic properties which special purpose algorithms can exploit . '' There is a project called XYYXF to factor composite Leyland numbers ., An integer (from the Latin "integer" meaning "whole") is a number that can be written without a fractional component. For example, 21, 4, 0, and 2048 are integers, while 9.75, , and  are not., In Algebraic number theory, an algebraic integer is a complex number that is a root of some monic polynomial (a polynomial whose leading coefficient is 1) with coefficients in formula_1 (the set of integers). The set of all algebraic integers, , is closed under addition and multiplication and therefore is a commutative subring of the complex numbers. The ring is the integral closure of regular integers formula_1 in complex numbers., Subject: leyland number, Relation: subclass_of, Options: (A) algorithm (B) blackboard (C) branch (D) category (E) complex number (F) decomposition (G) economics (H) engineering (I) integer (J) language (K) latin (L) mathematics (M) meeting (N) natural (O) natural number (P) number (Q) out (R) polynomial (S) problem (T) process (U) rational number (V) ring (W) set (X) test (Y) theorem (Z) theory ([) thought (\) time
[EX A]: natural number

[EX Q]: Context: An anagram is a type of word play , the result of rearranging the letters of a word or phrase to produce a new word or phrase , using all the original letters exactly once ; for example , the word anagram can be rearranged into nag - a - ram . Someone who creates anagrams may be called an `` anagrammatist '' . The original word or phrase is known as the subject of the anagram . Anagrams are often used as a form of mnemonic device as well . Any word or phrase that exactly reproduces the letters in another order is an anagram . However , the goal of serious or skilled anagrammatists is to produce anagrams that in some way reflect or comment on the subject ., Word games (also called word game puzzles) are spoken or board games often designed to test ability with language or to explore its properties., Anagrams (also known as Pirate Scrabble, Anagram, Snatch, Word Making and Taking and Grabscrab) is a tile-based word game that involves rearranging letter tiles to form words., Subject: anagram, Relation: instance_of, Options: (A) letter (B) pirate (C) test (D) word (E) word game
[EX A]:
word game