Math, asked by bhautik628, 4 months ago


=-20-(-10)
=20-10
=-10​

Answers

Answered by prabhas24480
3

Answer:

\star\:\:\bf\large\underline\blue{Question:-}

Question:−

Simplify the problem.

\star\:\:\bf\large\underline\blue{Solution:-}

Solution:−

\sqrt{a + b + 2x + 2 \sqrt{ab + (a + b)x + {x}^{2} } }

Now, let

y = \sqrt{ab + (a + b)x + {x}^{2} }y=

Therefore,

\sqrt{a + b + 2x + 2 \sqrt{ab + (a + b)x + {x}^{2} } }

= \sqrt{a + b + 2x + 2 + 2 \sqrt{y} }=

Now, we will factorise y.

\sqrt{ab + (a + b)x + {x}^{2} }

= \sqrt{ab + ax + bx + {x}^{2} }=

= \sqrt{a(b + x) +x(b+ x)}=

= \sqrt{(x + a)(x + b)}=

Now,

= \sqrt{a + b + 2x + 2 + 2 \sqrt{y} }=

= \small\sqrt{(x + a) + (x + b) + 2 \sqrt{(x + a)(x + b)} }=

= \sqrt{ {( \sqrt{x + a}) }^{2} + {( \sqrt{(x + b} )}^{2} + 2 \times \sqrt{(x + a} \times \sqrt{(x + b)} }=

= \sqrt{ {( \sqrt{x + a} + \sqrt{x + b} )}^{2} }=

= \sqrt{x + a} + \sqrt{x + b}=

\star\:\:\bf\large\underline\blue{Answer:-}

\sqrt{x + a } + \sqrt{x + b}\fcolorbox{aqua}{lime}{✓Verified\:Answer}

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Question:−

What are Tissues in Biology.

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Answer:−

Animal cells and plant cells can form tissues , such as muscle tissue in animals. A living tissue is made from a group of cells with a similar structure and function, which all work together to do a particular job.

\huge\blue\bigstar\pink{Additional \: Information }★Additional Information★AdditionalInformation★AdditionalInformation

There are 4 basic types of tissue: connective tissue, epithelial tissue, muscle tissue, and nervous tissue. Connective tissue supports other tissues and binds them together (bone, blood, and lymph tissues). Epithelial tissue provides a covering (skin, the linings of the various passages inside the body).

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✪QUESTION✪:-

Find the Solution of the given condition

\sf\dfrac{dy}{dx} - 3y \: cot \: x = sin2x,y = 2 \: when \: x = \dfrac{\pi}{2}

✪SOLUTION✪

•The given differential equation is a linear differential equation i.e, of the form \displaystyle\sf\dfrac{dy}{dx}+Py=Q

P=-3cot x and Q=sin 2 x

Here,⠀

\sf I.F.={ \sf e\:}^{ \displaystyle \sf\int \small P \: dx}={e}^{ \displaystyle \sf\int \small -3 \: cot \: x}

⠀⠀

\displaystyle \sf = {e}^{ - 3 \: log(sin \: x)} = {e}^{log(sin \: x) ^{ - 3} }=e

⠀⠀⠀⠀⠀⠀⠀⠀⠀\sf( Assuming\:0 < x < \pi)(Assuming0<x<π)

⠀⠀

\sf = {(sin \: x)}^{ - 3}=(sinx)

Hence,the solution of the given equation is given by

⠀⠀

\displaystyle \sf y{(sin \: x)}^{ - 3} = \int {(sin \: x)}^{ - 3} cos \: x \: dx+Cy(sinx)

= \displaystyle\sf2\int {(sin \: x)}^{ - 2} cos \: x \: dx=2∫(sinx)

\displaystyle \sf = \dfrac{2{(sin \: x)}^{ - 1} }{ - 1} + C=

⠀⠀\sf or \: y = - 2{(sin \: x)}^{3 - 1} + C \: {sin}^{3}xory=−2(sinx)

⠀⠀\sf or \: y = - 2{(sin \: x)}^{2} + C \: {sin}^{3}x .....(1)

When \sf x=\dfrac{\pi}{2},\:then\:y=2x=

⠀⠀

\sf \therefore2 = - 2{ sin}^{2} \bigg( \dfrac{ \pi}{2}\bigg) + C \:{sin}^{3} \bigg( \dfrac{\pi}{2} \bigg)

\implies \sf2 = - 2 + C⟹2=−2+C

⠀⠀

\implies \sf C=4⟹C=4</p><p></p><p>Hence the required solution is</p><p></p><p>[tex]\sf \: y = - 2{(sin \: x)}^{2} + 4{sin}^{3}x .......(from 1)\blue{\bold{\underline{\underline{Answer:-}}}}

Answer:−

GiveN:

Given linear equation x - 5y = 2k

Solution of the equation (5,0)

To FinD:

Value of k.....?

Solution:

It is given that,

Solution of equation = (5,0)

So, putting values of x and y

➝ x - 5y = 2k

➝ 5 - 5 × 0 = 2k

➝ 5 - 0 = 2k

➝ 5 = 2k

Flipping it,

➝ 2k = 5

➝ k = 5/2

So, Value of k = 5/2(A)

Hence, solved !!

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Answered by shivanshgamelab
0

Answer:

......False.....

False

20-10 is

10

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