Here, a = 1 and d = 1. Sum to n terms of an AP is given by S_n = n/2[ 2a + (n -1)d] The sum of the numbers of the houses preceding the house numbered x is equal to the sum of the numbers of the houses following it. Therefore Sx-₁ = S₄₉ - Sx ⇒ (x -1/2)[2a + (x - 1 - 1)d] ⇒ 49/2[2a + (49 - 1)d] - x/2[Read more
Here, a = 1 and d = 1.
Sum to n terms of an AP is given by
S_n = n/2[ 2a + (n -1)d]
The sum of the numbers of the houses preceding the house numbered x is equal to the sum of the numbers of the houses following it. Therefore
Sx-₁ = S₄₉ – Sx
⇒ (x -1/2)[2a + (x – 1 – 1)d]
⇒ 49/2[2a + (49 – 1)d] – x/2[2a + (x -1)d]
⇒ x -1/2[2(1) + (x -2)(1)]
⇒ 49/2[2(1) + 48(1)] – x/2[(1) + (x – 1)(1)]
⇒ (x – 1)[x] = 49[50] – x[x + 1]
⇒ x² – x = 2450 – x² – x
⇒ 2x² = 2450 x² = 1225 ⇒ x = 35
Hence, the value of x is 35.
A.P. : 37, 33, 29, ... Here, a = -37 and d = 33 - (-37) = 4. The sum of n terms of an AP is Given by S_n = n/2[2a + (n -1)d] ⇒ S₁₂ = 12/2[2(-37) + (12 -1)(4)] ⇒ S₁₂ = 6[- 74 + 44] = - 180
A.P. : 37, 33, 29, …
Here, a = -37 and d = 33 – (-37) = 4.
The sum of n terms of an AP is Given by
S_n = n/2[2a + (n -1)d]
⇒ S₁₂ = 12/2[2(-37) + (12 -1)(4)]
⇒ S₁₂ = 6[- 74 + 44] = – 180
The sum of n terms of an AP is given by S_n = 4n - n² Putting n = 1, we get First term = a₁ = S₁ = 4(1) - (1) ² = 3 Putting n = 2, we get sum of two terms = a₁ + a₂ = S₂ = 4(2) -(2)² = 4 ⇒ a₁ + a₂ = 4 ⇒ 3 + a₂ = 4 [∵ the first term a₁ = 3 ] ⇒ a₂ = 1 Hence, the second term is 1. Common difference d =Read more
The sum of n terms of an AP is given by
S_n = 4n – n²
Putting n = 1, we get
First term = a₁ = S₁ = 4(1) – (1) ² = 3
Putting n = 2, we get
sum of two terms = a₁ + a₂ = S₂ = 4(2) -(2)² = 4
⇒ a₁ + a₂ = 4
⇒ 3 + a₂ = 4 [∵ the first term a₁ = 3 ]
⇒ a₂ = 1
Hence, the second term is 1.
Common difference d = a₂ – a₁ = 1 – 3 = – 2
Therefore, the tenth term = a_10 = a + 9d = 3 + 9(-2) = – 16
Similarly, the nth term = a_n = a + (n -1)d = 3 + (n -1)(-2) = 5 – 2n
Here, a = 121 and d = 117 - 121 = - 4. Let, a_n be the first negative term of this AP. ⇒ a_n < 0 ⇒ a + (n - 1)d < 0 ⇒ 121 + (n -1)(-4) < 0 ⇒ 121 - 4n + 4 < 0 ⇒ 125 125/4 ⇒ n > 31.25 ⇒ n = 32 Hence, 32nd term of the AP: 121, 117, 113 ... is its first negative term.
Here, a = 121 and d = 117 – 121 = – 4.
Let, a_n be the first negative term of this AP.
⇒ a_n < 0
⇒ a + (n – 1)d < 0
⇒ 121 + (n -1)(-4) < 0
⇒ 121 – 4n + 4 < 0
⇒ 125 125/4
⇒ n > 31.25
⇒ n = 32
Hence, 32nd term of the AP: 121, 117, 113 … is its first negative term.
Let, the first term = a and common difference = d the sum of the third and the seventh terms of the AP is 6, therefore a₃ + a₇ = 6 ⇒ a + 2d + a + 6d = 6 ⇒ 2a + 8d = 6 ⇒ a + 4d = 3 ⇒ a = 3 - 4d ...(1) The product of the third and the seventh terms of the AP is 8, therefore (a₃)(a₇) = 8 ⇒ (a + 2d)(a +Read more
Let, the first term = a and common difference = d
the sum of the third and the seventh terms of the AP is 6, therefore
a₃ + a₇ = 6
⇒ a + 2d + a + 6d = 6
⇒ 2a + 8d = 6
⇒ a + 4d = 3
⇒ a = 3 – 4d …(1)
The product of the third and the seventh terms of the AP is 8, therefore
(a₃)(a₇) = 8
⇒ (a + 2d)(a + 6d) = 8
Putting the value of a from the equation(1), we get
(3 -2d)(3 +2d) = 8
⇒ 3² – 4d² = 8
⇒ 4d² = 1
⇒ d = ± 1/2
if, d = 1/2,
Putting the value of d in the equation (1), we get
a = 3 – 4(1/2) = 1
The sum of the 16 terms of this AP is given by
S₁₆ = 16/2[2a + 16 – 1)d] = 8[2(1) + 15 (1/2)] = 76
If, d = – 1/2,
Putting the value of d in the equation (1), we get
a = 3 – 4(-1/2) = 5
The sum of the 16 terms of this AP is given by
S₁₆ = 16/2[2a + 16 – 1)d] = 8 [2(5) + 15 (-1/2)] = 20
Hence, the sum of the 16 terms of AP is 20 or 76.
The houses of a row are numbered consecutively from 1 to 49. Show that there is a value of x such that the sum of the numbers of the houses preceding the house numbered x is equal to the sum of the numbers of the houses following it. Find this value of x.
Here, a = 1 and d = 1. Sum to n terms of an AP is given by S_n = n/2[ 2a + (n -1)d] The sum of the numbers of the houses preceding the house numbered x is equal to the sum of the numbers of the houses following it. Therefore Sx-₁ = S₄₉ - Sx ⇒ (x -1/2)[2a + (x - 1 - 1)d] ⇒ 49/2[2a + (49 - 1)d] - x/2[Read more
Here, a = 1 and d = 1.
See lessSum to n terms of an AP is given by
S_n = n/2[ 2a + (n -1)d]
The sum of the numbers of the houses preceding the house numbered x is equal to the sum of the numbers of the houses following it. Therefore
Sx-₁ = S₄₉ – Sx
⇒ (x -1/2)[2a + (x – 1 – 1)d]
⇒ 49/2[2a + (49 – 1)d] – x/2[2a + (x -1)d]
⇒ x -1/2[2(1) + (x -2)(1)]
⇒ 49/2[2(1) + 48(1)] – x/2[(1) + (x – 1)(1)]
⇒ (x – 1)[x] = 49[50] – x[x + 1]
⇒ x² – x = 2450 – x² – x
⇒ 2x² = 2450 x² = 1225 ⇒ x = 35
Hence, the value of x is 35.
Find the sum of the following APs: –37, –33, –29, . . ., to 12 terms.
A.P. : 37, 33, 29, ... Here, a = -37 and d = 33 - (-37) = 4. The sum of n terms of an AP is Given by S_n = n/2[2a + (n -1)d] ⇒ S₁₂ = 12/2[2(-37) + (12 -1)(4)] ⇒ S₁₂ = 6[- 74 + 44] = - 180
A.P. : 37, 33, 29, …
See lessHere, a = -37 and d = 33 – (-37) = 4.
The sum of n terms of an AP is Given by
S_n = n/2[2a + (n -1)d]
⇒ S₁₂ = 12/2[2(-37) + (12 -1)(4)]
⇒ S₁₂ = 6[- 74 + 44] = – 180
If the sum of the first n terms of an AP is 4n – n², what is the first term (that is S1)? What is the sum of first two terms? What is the second term? Similarly, find the 3rd, the 10th and the nth terms.
The sum of n terms of an AP is given by S_n = 4n - n² Putting n = 1, we get First term = a₁ = S₁ = 4(1) - (1) ² = 3 Putting n = 2, we get sum of two terms = a₁ + a₂ = S₂ = 4(2) -(2)² = 4 ⇒ a₁ + a₂ = 4 ⇒ 3 + a₂ = 4 [∵ the first term a₁ = 3 ] ⇒ a₂ = 1 Hence, the second term is 1. Common difference d =Read more
The sum of n terms of an AP is given by
See lessS_n = 4n – n²
Putting n = 1, we get
First term = a₁ = S₁ = 4(1) – (1) ² = 3
Putting n = 2, we get
sum of two terms = a₁ + a₂ = S₂ = 4(2) -(2)² = 4
⇒ a₁ + a₂ = 4
⇒ 3 + a₂ = 4 [∵ the first term a₁ = 3 ]
⇒ a₂ = 1
Hence, the second term is 1.
Common difference d = a₂ – a₁ = 1 – 3 = – 2
Therefore, the tenth term = a_10 = a + 9d = 3 + 9(-2) = – 16
Similarly, the nth term = a_n = a + (n -1)d = 3 + (n -1)(-2) = 5 – 2n
Which term of the AP : 121, 117, 113, . . ., is its first negative term?
Here, a = 121 and d = 117 - 121 = - 4. Let, a_n be the first negative term of this AP. ⇒ a_n < 0 ⇒ a + (n - 1)d < 0 ⇒ 121 + (n -1)(-4) < 0 ⇒ 121 - 4n + 4 < 0 ⇒ 125 125/4 ⇒ n > 31.25 ⇒ n = 32 Hence, 32nd term of the AP: 121, 117, 113 ... is its first negative term.
Here, a = 121 and d = 117 – 121 = – 4.
See lessLet, a_n be the first negative term of this AP.
⇒ a_n < 0
⇒ a + (n – 1)d < 0
⇒ 121 + (n -1)(-4) < 0
⇒ 121 – 4n + 4 < 0
⇒ 125 125/4
⇒ n > 31.25
⇒ n = 32
Hence, 32nd term of the AP: 121, 117, 113 … is its first negative term.
The sum of the third and the seventh terms of an AP is 6 and their product is 8. Find the sum of first sixteen terms of the AP.
Let, the first term = a and common difference = d the sum of the third and the seventh terms of the AP is 6, therefore a₃ + a₇ = 6 ⇒ a + 2d + a + 6d = 6 ⇒ 2a + 8d = 6 ⇒ a + 4d = 3 ⇒ a = 3 - 4d ...(1) The product of the third and the seventh terms of the AP is 8, therefore (a₃)(a₇) = 8 ⇒ (a + 2d)(a +Read more
Let, the first term = a and common difference = d
See lessthe sum of the third and the seventh terms of the AP is 6, therefore
a₃ + a₇ = 6
⇒ a + 2d + a + 6d = 6
⇒ 2a + 8d = 6
⇒ a + 4d = 3
⇒ a = 3 – 4d …(1)
The product of the third and the seventh terms of the AP is 8, therefore
(a₃)(a₇) = 8
⇒ (a + 2d)(a + 6d) = 8
Putting the value of a from the equation(1), we get
(3 -2d)(3 +2d) = 8
⇒ 3² – 4d² = 8
⇒ 4d² = 1
⇒ d = ± 1/2
if, d = 1/2,
Putting the value of d in the equation (1), we get
a = 3 – 4(1/2) = 1
The sum of the 16 terms of this AP is given by
S₁₆ = 16/2[2a + 16 – 1)d] = 8[2(1) + 15 (1/2)] = 76
If, d = – 1/2,
Putting the value of d in the equation (1), we get
a = 3 – 4(-1/2) = 5
The sum of the 16 terms of this AP is given by
S₁₆ = 16/2[2a + 16 – 1)d] = 8 [2(5) + 15 (-1/2)] = 20
Hence, the sum of the 16 terms of AP is 20 or 76.