Certainly! Let’s convert each given algebraic expression into its corresponding verbal expression.
1. For [tex]\( 6z^2 + 4 \)[/tex]:
- Break it down: [tex]\( 6z^2 \)[/tex] means "six z squared" and [tex]\( +4 \)[/tex] means "plus four".
- Putting it together, the verbal expression is: Six z squared plus four.
2. For [tex]\( 8 - b \)[/tex]:
- Break it down: [tex]\( 8 \)[/tex] means "eight" and [tex]\( -b \)[/tex] means "minus b".
- Putting it together, the verbal expression is: Eight minus b.
3. For [tex]\( 5 + 7d^4 \)[/tex]:
- Break it down: [tex]\( 5 \)[/tex] means "five" and [tex]\( 7d^4 \)[/tex] means "seven d to the fourth power".
- Putting it together, the verbal expression is: Five plus seven d to the fourth power.
4. For [tex]\( \frac{8x}{3} - 2x^2 \)[/tex]:
- Break it down: [tex]\( \frac{8x}{3} \)[/tex] means "eight x divided by three" and [tex]\( -2x^2 \)[/tex] means "minus two x squared".
- Putting it together, the verbal expression is: Eight x divided by three minus two x squared.
5. For [tex]\( 16(h + 3) \)[/tex]:
- Break it down: The expression inside the parenthesis [tex]\( (h + 3) \)[/tex] means "the quantity h plus three", and multiplying by 16 means "sixteen times".
- Putting it together, the verbal expression is: Sixteen times the quantity h plus three.
6. For [tex]\( \frac{a + 10}{7} \)[/tex]:
- Break it down: The numerator [tex]\( a + 10 \)[/tex] means "the quantity a plus ten", and dividing by 7 means "divided by seven".
- Putting it together, the verbal expression is: The quantity a plus ten divided by seven.
These verbal expressions accurately describe each algebraic expression provided.
