if 20th term and 30th term of Arthematic progression are 121 and 181 respectively find the 40th term of Arthematic progression About the author Kaylee
Answer: 241 Answer Step-by-step explanation: [tex]a_{20} = 121\\a_{30} = 181\\a_{40} = ?[/tex] [tex]a_{20} = 121\\a + (20 – 1) * d = 121\\a + 19d = 121 ——equation 1\\a_{30} = 181\\a + (30-1) * d = 181\\a + 29d = 181 ———-equation 2\\Subtracting equation 2 from 1\\29d – 19d = 181 – 121\\10d = 60\\d = 6[/tex] Putting value of d in equation 1 a + 19(6) = 121 a + 114 = 121 a = 121-114 a = 7 Now, a40 = a + (40-1) X d = 7 + 39(6) = 7 + 234 = 241 Answer Reply
Answer: [tex]\huge\mathbb\fcolorbox{purple}{lavenderblush}{✰Answer}[/tex] ✬ 40th Term = 241 ✬ Step-by-step explanation: Given: 20th and 30th term of an AP is 121 and 181 respectively. To Find: What is the 40th term of AP ? Solution: As we know that an AP series is given by ★ a + (n – 1)d ★ a = first term n = number of terms d = common difference A/q 20th term is 121. ➙ a + (20 – 1)d = 121 ➙ a + 19d = 121 ➙ a = 121 – 19dㅤㅤㅤㅤㅤeqⁿ i Now , 30th term is 181 ➙ a + (30 – 1)d = 181 ➙ a + 29d = 181 ➙ 121 – 19d + 29d = 181 ㅤㅤㅤfrom eqⁿ i ➙ 10d = 181 – 121 ➙ d = 60/10 = 6 So the common difference of AP is 6. Now putting the value of d in eqⁿ 1. ➮ a = 121 – 19 × 6 ➮ a = 121 – 114 ➮ a = 7 So the first term of AP is 7. ∴ 40th term will be ⟹ a + (40 – 1)d ⟹ 7 + 39 × 6 ⟹ 7 + 234 ⟹ 241 Hence, the 40th term of AP will be 241. Reply
Answer:
241 Answer
Step-by-step explanation:
[tex]a_{20} = 121\\a_{30} = 181\\a_{40} = ?[/tex]
[tex]a_{20} = 121\\a + (20 – 1) * d = 121\\a + 19d = 121 ——equation 1\\a_{30} = 181\\a + (30-1) * d = 181\\a + 29d = 181 ———-equation 2\\Subtracting equation 2 from 1\\29d – 19d = 181 – 121\\10d = 60\\d = 6[/tex]
Putting value of d in equation 1
a + 19(6) = 121
a + 114 = 121
a = 121-114
a = 7
Now, a40 = a + (40-1) X d
= 7 + 39(6)
= 7 + 234
= 241 Answer
Answer:
[tex]\huge\mathbb\fcolorbox{purple}{lavenderblush}{✰Answer}[/tex]
✬ 40th Term = 241 ✬
Step-by-step explanation:
Given:
20th and 30th term of an AP is 121 and 181 respectively.
To Find:
What is the 40th term of AP ?
Solution: As we know that an AP series is given by
★ a + (n – 1)d ★
A/q
20th term is 121.
➙ a + (20 – 1)d = 121
➙ a + 19d = 121
➙ a = 121 – 19dㅤㅤㅤㅤㅤeqⁿ i
Now ,
30th term is 181
➙ a + (30 – 1)d = 181
➙ a + 29d = 181
➙ 121 – 19d + 29d = 181 ㅤㅤㅤfrom eqⁿ i
➙ 10d = 181 – 121
➙ d = 60/10 = 6
So the common difference of AP is 6. Now putting the value of d in eqⁿ 1.
➮ a = 121 – 19 × 6
➮ a = 121 – 114
➮ a = 7
So the first term of AP is 7.
∴ 40th term will be
⟹ a + (40 – 1)d
⟹ 7 + 39 × 6
⟹ 7 + 234
⟹ 241
Hence, the 40th term of AP will be 241.