WebAug 25, 2024 · In an AP, if a = 1, an = 20 and Sn = 399, then n is equal to A. 19 B. 21 C. 38 D. 42. ← Prev Question Next Question →. 0 votes. 17.2k views. asked Aug 25, 2024 in … WebBesides giving the explanation of In an A.P. if a=1,An=20 and Sn=399, then find the value of n.?, a detailed solution for In an A.P. if a=1,An=20 and Sn=399, then find the value of n.? has been provided alongside types of In an A.P. if a=1,An=20 and Sn=399, then find the value of n.? theory, EduRev gives you an ample number of questions to …
In an AP if a=1, a n = 20 and s n =399. then n is - Meritnation
WebQuestion If an AP has a = 1, a n = 20 and S n = 399, then find the value of n. Solution Compute the value of n: Formulae: The n th term of an AP is a n = a + n - 1 d and the sum of n terms of a series in an AP is S n = n 2 2 a + ( n - 1) d. Substitute a = 1, a n = 20 in the n th term of an AP formula. WebIf in an AP a = 1, t n = 20 and Sn = 399 then n is (a) 19 (b) 21 (c) 38 (d) 42 Report 497 Share Follow Answer peter Reputation: 2.6K University of Lagos, Nigeria 30 July 2024 Comments 1 answer (s) ADVERTISEMENT - CONTINUE BELOW judziy Reputation: 3.0K University of Benin, Nigeria 30 July 2024 1 smallrig iphone 11 pro max cage
If in an AP a = 1, tn = 20 and Sn = 399 then n is (a) 19 (b) 21 (c) 38 ...
WebClick here👆to get an answer to your question ️ In an A.P 1^st term is 1 and the last term is 20 . The sum of all terms is = 399 then n = .... Solve Study Textbooks Guides. Join / Login >> Class 10 >> Maths >> Arithmetic Progressions >> Sum of an AP >> In an A.P 1^st term is 1 and the last te. Question . In an A.P 1 s t term is 1 and the ... WebBesides giving the explanation of In an A.P. if a=1,An=20 and Sn=399, then find the value of n.?, a detailed solution for In an A.P. if a=1,An=20 and Sn=399, then find the value of n.? … WebIn an AP, if a = 1, an = 20 and Sn = 399, then n is equal to (a) 19 (b) 21 (c) 38 (d) 42 Solution: Question 18: The sum of first five multiples of 3 is (a) 45 (b) 55 (c) 65 (d) 75 Solution: (a) The first five multiples of 3 are 3, 6, 9,12 and 15. Here, first term, a = 3, common difference, d = 6-3 = 3 and number of terms, n = 5 hilbert of sinc