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The 11th term and the 21st term of an A.P are 16 and 29 respectively, then find the first term, common difference and the 34th term.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Find the sum of all members from 50 to 250 which divisible by 6 and find t13.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Obtain the sum of the first 56 terms of an A.P. whose 18th and 39th terms are 52 and 148 respectively.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
For a given A.P. a = 3.5, d = 0, then tn = _______.
Concept: General Term of an Arithmetic Progression
Find the 23rd term of the following A.P.: 9, 4,-1,-6,-11.
Concept: General Term of an Arithmetic Progression
Find second and third terms of an A.P. whose first term is – 2 and the common difference is – 2.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
In an A.P. sum of three consecutive terms is 27 and their products is 504. Find the terms. (Assume that three consecutive terms in an A.P. are a – d, a, a + d.)
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Find t5 if a = 3 आणि d = −3
Concept: General Term of an Arithmetic Progression
If a = 6 and d = 10, then find S10
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
How many two-digit numbers are divisible by 5?
Activity :- Two-digit numbers divisible by 5 are, 10, 15, 20, ......, 95.
Here, d = 5, therefore this sequence is an A.P.
Here, a = 10, d = 5, tn = 95, n = ?
tn = a + (n − 1) `square`
`square` = 10 + (n – 1) × 5
`square` = (n – 1) × 5
`square` = (n – 1)
Therefore n = `square`
There are `square` two-digit numbers divisible by 5
Concept: General Term of an Arithmetic Progression
A merchant borrows ₹ 1000 and agrees to repay its interest ₹ 140 with principal in 12 monthly instalments. Each instalment being less than the preceding one by ₹ 10. Find the amount of the first instalment
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Complete the following activity to find the 19th term of an A.P. 7, 13, 19, 25, ........ :
Activity:
Given A.P. : 7, 13, 19, 25, ..........
Here first term a = 7; t19 = ?
tn + a + `(square)`d .........(formula)
∴ t19 = 7 + (19 – 1) `square`
∴ t19 = 7 + `square`
∴ t19 = `square`
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Find the sum of first 'n' even natural numbers.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Measures of angles of a triangle are in A.P. The measure of smallest angle is five times of common difference. Find the measures of all angles of a triangle. (Assume the measures of angles as a, a + d, a + 2d)
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Find the sum of all odd numbers between 351 and 373.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Calculate the sum of 35 terms in an AP, whose fourth term is 16 and ninth term is 31.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Find the middle term of the AP. 95, 86, 77, ........, – 247.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Find the sum of all even numbers from 1 to 250.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
Sum of 1 to n natural number is 45, then find the value of n.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
If the first term of an A.P. is p, second term is q and last term is r, then show that sum of all terms is `(q + r - 2p) xx ((p + r))/(2(q - p))`.
Concept: Sum of First ‘n’ Terms of an Arithmetic Progressions
