Math  /  Algebra

Question16. Given that the three expressions below belong to the first three terms of an arithmetic sequence, find the following: a) Find the value of the of " xx " (1 Point) t1=3xt2=4x+2t3=6x2t_{1}=3 x \quad t_{2}=4 x+2 \quad t_{3}=6 x-2
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17. b) FInd the value of the common difference "d" (1 Point)

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18. c) Find the sum of the first 10 terms ( 1 Point)

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Studdy Solution

STEP 1

1. The expressions t1=3x t_1 = 3x , t2=4x+2 t_2 = 4x + 2 , and t3=6x2 t_3 = 6x - 2 are the first three terms of an arithmetic sequence.
2. In an arithmetic sequence, the difference between consecutive terms is constant and is called the common difference d d .
3. The sum of the first n n terms of an arithmetic sequence can be calculated using the formula Sn=n2(2a+(n1)d) S_n = \frac{n}{2} (2a + (n-1)d) , where a a is the first term and d d is the common difference.

STEP 2

1. Find the value of x x .
2. Find the value of the common difference d d .
3. Find the sum of the first 10 terms.

STEP 3

To find the value of x x , we use the property of arithmetic sequences that the difference between consecutive terms is constant. Therefore, the difference between t2 t_2 and t1 t_1 should be equal to the difference between t3 t_3 and t2 t_2 .
Calculate the difference t2t1 t_2 - t_1 :
t2t1=(4x+2)3x t_2 - t_1 = (4x + 2) - 3x t2t1=x+2 t_2 - t_1 = x + 2
Calculate the difference t3t2 t_3 - t_2 :
t3t2=(6x2)(4x+2) t_3 - t_2 = (6x - 2) - (4x + 2) t3t2=2x4 t_3 - t_2 = 2x - 4
Set the two differences equal to each other:
x+2=2x4 x + 2 = 2x - 4
Solve for x x :
2+4=2xx 2 + 4 = 2x - x 6=x 6 = x

STEP 4

Now that we have x=6 x = 6 , substitute x x back into the expressions to find the terms:
t1=3x=3(6)=18 t_1 = 3x = 3(6) = 18 t2=4x+2=4(6)+2=26 t_2 = 4x + 2 = 4(6) + 2 = 26 t3=6x2=6(6)2=34 t_3 = 6x - 2 = 6(6) - 2 = 34
Calculate the common difference d d :
d=t2t1=2618=8 d = t_2 - t_1 = 26 - 18 = 8

STEP 5

To find the sum of the first 10 terms, use the formula for the sum of an arithmetic sequence:
Sn=n2(2a+(n1)d) S_n = \frac{n}{2} (2a + (n-1)d)
Here, n=10 n = 10 , a=t1=18 a = t_1 = 18 , and d=8 d = 8 .
S10=102(2×18+(101)×8) S_{10} = \frac{10}{2} (2 \times 18 + (10-1) \times 8) S10=5(36+72) S_{10} = 5 (36 + 72) S10=5×108 S_{10} = 5 \times 108 S10=540 S_{10} = 540
The value of x x is:
6 \boxed{6}
The value of the common difference d d is:
8 \boxed{8}
The sum of the first 10 terms is:
540 \boxed{540}

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