Physics, asked by bobesmarius46, 5 months ago

PROIECT Realizati un proiect de 3- 5 pagini din urmatoarele lectii 1.miscare,repaus,traictoria miscarii 2.distanta parcursa 3. durata miscarii 4.viteza medie 5.miscarea rectilinie si uniforma 6.acceleratia medie. folosind doar MANUALUL de clasa a-VI-a

Answers

Answered by Anonymous
7

Answer:

\color{red} {{{\Large {\bf{To\:\:Simplify\::\frac{\sin ^4(x)-\cos ^4(x)}{\sin ^2(x)-\cos ^2(x)}}}}}}

\color{green}{{{\large {\bf{Your\:\:Answer\::\frac{\sin ^4(x)-\cos ^4(x)}{\sin ^2(x)-\cos ^2(x)}=1}}}}}

\color{yellow} {\Huge {\sf{Solution:}}}

\color{blue} {\large {\bf{Factor\:\sin ^4(x)-\cos ^4(x)}}}

\tt \color{blue} {\mathrm{Rewrite\:}\sin ^4(x)-\cos ^4(x)\mathrm{\:as\:}(\sin ^2(x))^2-(\cos ^2(x))^2=(\sin ^2(x))^2-(\cos ^2(x))^2}

\color{fuchsia} {\normalsize {\mathrm{Apply\:exponent\:rule}:\quad \:a^{bc}=(a^b)^c}}

\color{fuchsia} {\normalsize \sin ^4(x)=(\sin ^2(x))^2}

\color{fuchsia} {\normalsize =(\sin ^2(x))^2-\cos ^4(x)}=

\color{fuchsia} {\normalsize \mathrm{Apply\:exponent\:rule}:\quad \:a^{bc}=(a^b)^c}

\color{fuchsia} {\normalsize \cos ^4(x)=(\cos ^2(x))^2}

\color{fuchsia} {\normalsize =(\sin ^2(x))^2-(\cos ^2(x))^2}=

\mathrm{Apply\:Difference\:of\:Two\:Squares\:Formula:\:}x^2-y^2=(x+y)(x-y)

(\sin ^2(x))^2-(\cos ^2(x))^2=(\sin ^2(x)+\cos ^2(x))(\sin ^2(x)-\cos ^2(x))

=(\sin ^2(x)+\cos ^2(x))(\sin ^2(x)-\cos ^2(x))=

\color{blue} {\large {\bf{Factor\:\sin ^2(x)-\cos ^2(x)}}}

\mathrm{Apply\:Difference\:of\:Two\:Squares\:Formula:\:}x^2-y^2=(x+y)(x-y)

\sin ^2(x)-\cos ^2(x)=(\sin (x)+\cos (x))(\sin (x)-\cos (x))

(x)=(sin(x)+cos(x))(sin(x)−cos(x))

=(\sin (x)+\cos (x))(\sin (x)-\cos (x))=(sin(x)+cos(x))(sin(x)−cos(x))

\large=(\sin ^2(x)+\cos ^2(x))(\sin (x)+\cos (x))(\sin (x)-\cos (x))\ \textless \ br /\ \textgreater \ (x))(sin(x)+cos(x))(sin(x)−cos(x))\ \textless \ br /\ \textgreater \ \large =\frac{(\sin ^2(x)+\cos ^2(x))(\sin (x)+\cos (x))(\sin (x)-\cos (x))}{\sin ^2(x)-\cos ^2(x)}=

\mathrm{Apply\:Difference\:of\:Two\:Squares\:Formula:\:}x^2-y^2=(x+y)(x-y)

\sin ^2(x)-\cos ^2(x)=(\sin (x)+\cos (x))(\sin (x)

(x)=(sin(x)+cos(x))(sin(x)−cos(x))\ \textless \ br /\ \textgreater \ =\frac{(\sin ^2(x)+\cos ^2(x))(\sin (x)+\cos (x))(\sin (x)-\cos (x))}{(\sin (x)+\cos (x))(\sin (x)-\cos (x))}=

\mathrm{Cancel\:}\frac{(\sin ^2(x)+\cos ^2(x))(\sin (x)+\cos (x))(\sin (x)-\cos (x))}{(\sin (x)+\cos (x))(\sin (x)-\cos (x))}:\quad \sin ^2(x)+\cos ^2(x)Cancel \ \textless \ br /\ \textgreater \ (sin(x)+cos(x))(sin(x)−cos(x))

\mathrm{Cancel\:the\:common\:factor:}\:\sin (x)+\cos(x)Cancelthecommonfactor:sin(x)+cos(x)

=\frac{(\sin ^2(x)+\cos ^2(x))(\sin (x)-\cos (x))}{\sin (x)-\cos (x)}=

\mathrm{Cancel\:the\:common\:factor:}\:\sin (x)-\cos

\mathrm{Use\:the\:following\:identity}:\quad \cos ^2(x)+\sin

\huge \boxed{\color{red} {\ \huge =1}}

Science is a systematic enterprise that builds and organizes knowledge in the form of testable explanations and predictions about the universe. The earliest roots of science can be traced to Ancient Egypt and Mesopotamia in around 3500 to 3000 BCE. 

Previous Question
Next Question
Similar questions
English, 2 months ago
i What special information did Rajvir give to Pranjol about tea?​
Math, 2 months ago
Solve each equation. 1. 3x - 18 = 0 6. 3x - 12 = 0 2 . 4x - 12 = 0 7 . 8x - 12 = 12 3 . 5x + 20 = - 14 3. 9x + 20 = - 7 4 . 7x - 6 = - 20 4 . 2x - 6 = - 20 5 . 6x = - 24 5. 5x - 4 = - 24​...
Science, 2 months ago
please balance this equation C6H6+O2 => CO2+H2O​...
English, 5 months ago
who like the movie kabir singh ​...
Chemistry, 5 months ago
what family of homologous series does butanone belong to​...
Social Sciences, 11 months ago
disadvantage of globe​...
Math, 11 months ago
solve of simple equation 2x - 3 = - 5​...
Computer Science, 11 months ago
Differentiate between Ordered and Unordered list. ​please answer in tabular form...