Respuesta :
Answer:
1). [tex]T_{25}=119[/tex]
2). [tex]T_{1}=-23[/tex]
[tex]T_{2}=-23+2=-21[/tex]
[tex]T_{3}=-23+4=-19[/tex]
Step-by-step explanation:
First term of an arithmetic sequence is (-1) and common difference is 5.
Then we have to find twenty fifth term of this arithmetic sequence.
Since explicit formula of an arithmetic sequence is represented by
[tex]T_{n}=a+(n-1)d[/tex]
Where [tex]T_{n}[/tex] represents nth term of the sequence.
a = first term
n = number of term
and d = common difference
Now we will find 25th term of this sequence.
[tex]T_{25}=(-1)+(25-1)5[/tex]
= (-1) + 120
= 119
Similarly in second part of this question we have to find first three terms of an arithmetic sequence in which
[tex]T_{21}=17[/tex] and
[tex]T_{50}=75[/tex]
Now from the explicit formula
17 = a + (21 - 1)d
17 = a + 20d --------(1)
75 = a + (50 - 1)d
75 = a + 49d --------(2)
Now we subtract equation 1 from 2
75 - 17 = 49d - 20d
29d = 58
d = [tex]\frac{58}{29}=2[/tex]
By putting d = 2 in equation 1
17 = a + 20×2
17 = a + 40
a = 17 - 40
a = -23
Therefore, first three terms of this sequence will be
[tex]T_{1}=-23[/tex]
[tex]T_{2}=-23+2=-21[/tex]
[tex]T_{3}=-23+4=-19[/tex]
