Question

I need help to find the indicated operation:f(a)= a-4g(a)= a^3+3Find (f×g)(0)

asked Mar 16, 2023 166k views

1 Answer

← Prev Question Next Question →

Related questions

asked May 4, 2023 51.2k views

Function operation13) g(n) = 3n + 1h(n) = 2n - 3Find (-4g + 5h)(-2n)

Biorubenfs asked May 4, 2023

by Biorubenfs

7.8k points

1 answer

2 votes

51.2k views

asked Nov 5, 2023 83.8k views

H(x)=2x-4g(x)=x^3-3Find(h+g)(4)

Razlebe asked Nov 5, 2023

by Razlebe

7.3k points

1 answer

1 vote

83.8k views

asked May 25, 2023 163k views

F (a) = 2a + 4g(a) = a2 − 3Find ( f g)(a)

Bitsy asked May 25, 2023

by Bitsy

7.7k points

1 answer

1 vote

163k views

Ask a Question

Nilakantha Singh Deo · Answer 1 · 2023-03-22T17:35:41+0000

You have this function:

$f\mleft(a\mright)=a-4$

And the other function is:

$g\mleft(a\mright)=a^3+3$

So, to find

$\mleft(f\cdot g\mright)(a)$

You need to multiply both functions, as you can see below:

$\begin{gathered} (f\cdot g)(a)=(a-4)(a^3+3) \\ (f\cdot g)(a)=(a)(a^3)+(a)(3)+(-4)(a^3)+(-4)(3) \\ (f\cdot g)(a)=a^4+3a-4a^3-12 \\ (f\cdot g)(a)=a^4-4a^3+3a-12 \end{gathered}$

Now, to find

$(f\cdot g)(0)$

You need to substitute this value and evaluate:

Then, you get:

$\begin{gathered} (f\cdot g)(0)=(0)^4-4(0)^3+3(0)-12 \\ (f\cdot g)(0)=-12 \end{gathered}$

The answer is:

$(f\cdot g)(0)=-12$

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

0 Comments

Please log in or register to add a comment.

Related questions

Other Questions