Answer:
[tex]\int _{-3}^4 R(n)dn =7[/tex]
Step-by-step explanation:
Definite Integrals
One of the properties of the definite integrals called This is called internal addition is:
[tex]\int _a^b f(x)dx=\int _a^c f(x)dx+\int _c^b f(x)dx[/tex]
We are required to find
[tex]\int _{-3}^4 R(n)dn[/tex]
And we are given:
[tex]\int _{-3}^0 R(n)dn =12[/tex]
[tex]\int _{0}^4 R(n)dn =-5[/tex]
Thus, applying the internal addition property:
[tex]\int _{-3}^4 R(n)dn =\int _{-3}^0 R(n)dn+\int _{0}^4 R(n)dn[/tex]
[tex]\int _{-3}^4 R(n)dn =12-5=7[/tex]
[tex]\boxed{\int _{-3}^4 R(n)dn =7}[/tex]
