A father is now 3 times as old as his son. 5 years ago he was 4 times as old as his son. Find theirpresent ages. About the author Hadley
Step-by-step explanation: [tex] \huge{ \fcolorbox{purple}{pink}{ \fcolorbox{yellow}{green}{ \red{AnsWer}}}}[/tex] Let us assume to the contrary that [tex]( \sqrt{3} + \sqrt{5}) {}^{2} [/tex] is a rational number, then there exists a and b co- prime integers such that, [tex]{\sqrt{3} + \sqrt{5}) {}^{2}} = a/b[/tex] [tex] \large{ \blue{3 + 5 + 2 \sqrt{15 =a/b}}}[/tex] [tex] \large{ \green{8 + 2 \sqrt{15} = a/b}}[/tex] [tex] \large{ \orange{2 \sqrt{15} = (a/b) – 8}}[/tex] [tex] \large{ \red{2 \sqrt{15} = (a – 8b)/b}}[/tex] [tex] \large{ \pink{ \sqrt{15} = (a – 8b)/2b}}[/tex] [tex] \large{ \color{yellow}{a – (8b)/2b \: is \: a \: rational \: number}}[/tex] Then [tex] \sqrt{15} [/tex] is also a rational number But as we know [tex] \sqrt{15} [/tex] is an irrational number. This is a contradication. This contradication has arisen as our assumption is wrong. [tex] { \color{navy}{hence \: \sqrt{3} + \sqrt{5} {}^{2} \: is \: an \: irrational \: number}}[/tex] [tex] \large { \underline{ \underline{ \mathfrak{ \color{purple}{@HoneyStars♡}}}}}[/tex] Reply
Step-by-step explanation:
[tex] \huge{ \fcolorbox{purple}{pink}{ \fcolorbox{yellow}{green}{ \red{AnsWer}}}}[/tex]
Let us assume to the contrary that [tex]( \sqrt{3} + \sqrt{5}) {}^{2} [/tex] is a rational number, then there exists a and b co- prime integers such that,
[tex]{\sqrt{3} + \sqrt{5}) {}^{2}} = a/b[/tex]
[tex] \large{ \blue{3 + 5 + 2 \sqrt{15 =a/b}}}[/tex]
[tex] \large{ \green{8 + 2 \sqrt{15} = a/b}}[/tex]
[tex] \large{ \orange{2 \sqrt{15} = (a/b) – 8}}[/tex]
[tex] \large{ \red{2 \sqrt{15} = (a – 8b)/b}}[/tex]
[tex] \large{ \pink{ \sqrt{15} = (a – 8b)/2b}}[/tex]
[tex] \large{ \color{yellow}{a – (8b)/2b \: is \: a \: rational \: number}}[/tex]
Then [tex] \sqrt{15} [/tex] is also a rational number
But as we know [tex] \sqrt{15} [/tex] is an irrational number.
This is a contradication.
This contradication has arisen as our assumption is wrong.
[tex] { \color{navy}{hence \: \sqrt{3} + \sqrt{5} {}^{2} \: is \: an \: irrational \: number}}[/tex]
[tex] \large { \underline{ \underline{ \mathfrak{ \color{purple}{@HoneyStars♡}}}}}[/tex]