Answer: [tex]9r^{3} +2r^{4}[/tex]
Step-by-step explanation:
1. You have thte following equation given in the problem above:
[tex](4r^{3} +3r^{4})-(r^{4}-5r^{3})[/tex]
2. Then, you must multiply each sign of the terms inside the parentheses by the negative sign that is outside of the parentheses:
[tex]4r^{3} +3r^{4}-r^{4}+5r^{3}[/tex]
3. Now, you must add the like terms. Then, you obtain the following result:
[tex]9r^{3} +2r^{4}[/tex]
Answer:
[tex](4r^3+3r^4)-(r^4-5r^3)=r^3(9+2r)[/tex]
Step-by-step explanation:
we are given expression as
[tex](4r^3+3r^4)-(r^4-5r^3)[/tex]
Firstly, we will distribute negative sign
and we get
[tex](4r^3+3r^4)-(r^4-5r^3)=4r^3+3r^4-r^4+5r^3[/tex]
now, we can combine like terms
[tex](4r^3+3r^4)-(r^4-5r^3)=4r^3+5r^3+3r^4-r^4[/tex]
[tex](4r^3+3r^4)-(r^4-5r^3)=9r^3+3r^4-r^4[/tex]
[tex](4r^3+3r^4)-(r^4-5r^3)=9r^3+2r^4[/tex]
now, we can factor it
[tex](4r^3+3r^4)-(r^4-5r^3)=r^3(9+2r)[/tex]
so, we get
[tex](4r^3+3r^4)-(r^4-5r^3)=r^3(9+2r)[/tex]
