Respuesta :
Answer:
[tex]f_1(t),f_2(t)[/tex] and [tex]f_3(t)[/tex] linearly dependent.
The required relation is
[tex]\therefore a[f_1(t)-4f_2(t)+5f_3(t)]=0[/tex]
where a is a nonzero number.
Step-by-step explanation:
Given that,
[tex]f_1(t)=4t-5[/tex] , [tex]f_2(t)=4t^2+1[/tex] and [tex]f_3(t)=5t^2+t[/tex]
We consider a linear combination
[tex]k_1f_1(t)+k_2f_2(t)+k_3f_3(t)=0[/tex]
Putting the value of [tex]f_1(t),f_2(t)[/tex] and [tex]f_3(t)[/tex]
[tex]\therefore k_1(4t-5)+k_2(4t^2+1)+k_3(5t^2+t)=0[/tex]
[tex]\Rightarrow 4k_1t-5k_1+4k_2t^2+k_2+5k_3t^2+k_3t=0[/tex]
[tex]\Rightarrow 4k_2t^2+5k_3t^2+k_3t+4k_1t-5k_1+k_2=0[/tex]
[tex]\Rightarrow (4k_2+5k_3)t^2+(k_3+4k_1)t-5k_1+k_2=0[/tex]
Equating the co-efficient of [tex]t^2[/tex], t and constant terms
[tex]\therefore (4k_2+5k_3)=0[/tex] .......(1)
[tex]\therefore (k_3+4k_1)=0[/tex] ..........(2)
[tex]\therefore -5k_1+k_2=0[/tex] ..........(3)
From (2) we get
[tex]\therefore (k_3+4k_1)=0[/tex]
[tex]\therefore k_3=-4k_1[/tex]
From (3) we get
[tex]\therefore -5k_1+k_2=0[/tex]
[tex]\Rightarrow k_2=5k_1[/tex]
Putting the value of [tex]k_2 \ and \ k_3[/tex] in equation (3)
[tex]\therefore (4k_2+5k_3)=0[/tex]
[tex]\Rightarrow 4.5k_1+5(-4k_1)=0[/tex]
[tex]\Rightarrow 0=0[/tex]
Let [tex]k_1=a[/tex] [ a is a non zero number]
Then [tex]k_2= 5a[/tex] and [tex]k_3=-4a[/tex]
We get a nonzero value of [tex]k_1[/tex],[tex]k_2 \ and \ k_3[/tex] .
Then [tex]f_1(t),f_2(t)[/tex] and [tex]f_3(t)[/tex] linearly dependent.
The required relation is
[tex]af_1(t)+(-4a)f_2(t)+5af_3(t)=0[/tex]
[tex]\Rightarrow a[f_1(t)-4f_2(t)+5f_3(t)]=0[/tex] [a is a nonzero number]
