Answer: " 1035 " .
______________________________________________
→ " F(10) = 1035 " .
______________________________________________
Step-by-step explanation:
______________________________________________
To solve:
For the "right-hand side" of the equation; substitute "10" for all "x" values:
Given:
F(10) = 5(x - 1)(2x + 3) ;
→ F(10) = 5(10-1)(2*10 + 3) ;
______________________________________________
How, to simplify the right-hand side of the equation;
Solve using PE MD AS ; the mnemonic device for the order of operations to use for simplifying an expression:
<u>P</u>lease <u>E</u>xcuse <u>M</u>y <u>D</u>ear <u>A</u>unt <u>S</u>ally [or: <u>S</u>usan—either name is fine] :
or the variant:
______________________________________________
<u>B</u>e <u>E</u>xcused, <u>M</u>y <u>D</u>ear <u>A</u>unt <u>S</u>ally/<u>S</u>usan .
______________________________________________
in which the letters of the first words of the sentence in this mnemonic device represent the order of operations performed, as follows:
______________________________________________
(<u>P</u>arentheses, followed by <u>E</u>xponents); if these occur; in that order;
or: using the variant:
{<u>B</u>rackets, followed by <u>E</u>xponents}; if these occur, in that order;
— in which "<u>P</u>arentheses" are considered a type of "<u>B</u>rackets" ;
— and in which if <u><em>both</em></u><em> </em>: <u>B</u>rackets <u><em>and</em></u><em> </em><u>P</u>arentheses occur,
the "<u>B</u>rackets", take first in the order of operations
[if they occur]; followed by: "<u>P</u>arentheses" ;
and then followed by: "<u>E</u>xponents" (if they occur);
_________________________________________
then: <u>M</u>ultiplication (if it occurs) <em><u>and</u></em> <u>D</u>ivision (if it occurs);
<em><u>However, instead of </u></em>"<u>M</u>ultiplication followed by <u>D</u>ivision" ;
the difference is that these operations are performed <u>from left to right</u>— <u>as they appear</u> (if <em>both</em> <u>M</u>ultiplication <em>and</em> <u>D</u>ivision occur) within the expression ;
______________________________________________
then: <u>A</u>ddition (if it occurs) <em><u>and</u></em> Subtraction (if it occurs);
<em><u>However, instead of </u></em><em> </em>"<u>A</u>ddition followed by <u>S</u>ubtraction" ;
the difference is that these operations are performed <u>from left to right</u>— <u>as they appear</u> (if <em>both</em> <u>A</u>ddition <em>and</em> <u>S</u>ubtraction occur) within the expression.
______________________________________________
So:
Given:
F(10) = 5(x - 1)(2x + 3) ;
→ F(10) = 5(10-1)(2*10 + 3) ;
We can calculate—and simplify—the "right-hand side" of the equation; as follows:
We have:
→ " 5(10-1)(2*10 + 3) " ;
→ that is; " 5 * (10 - 1) * (2*10 + 3) ;
______________________________________________
We do have "parentheses" in this expression:
We shall begin by simplifying the values within the two (2) terms that are enclosed within parentheses:
Start with:
" (10 - 1) " ;
10 - 1 = 9 .
______________________________________________
Now, let us continue with the second term that is in parentheses:
" (2*10 +3 ) " ;
→ 2*10 + 3 = ?? ;
→ Note the order of operations rules—{as stated above]; state that "multiplication/division" come before "addition/subtraction" ;
→ So: " 2*10 + 3 = (2*10) + 3 = 20 + 3 = 23 .
On "the right-hand side" of the given equation; we have:
→ " 5 * (10 - 1) * (2*10 + 3) ;
Replace the terms: "(10 - 1)" with: "9" ;
"(2*10 + 3)" with: "23" ;
And rewrite:
→ F(10) = 5 * 9 * 23 ;
= 45 * 23 ;
= 1035 .
______________________________________________
The answer is: 1035 .
______________________________________________
Hope this is helpful to you.
Best wishes!
______________________________________________
