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the supplement of 105° is 75°

thanks

180-105=75 is the answer

can you please try my sum given

Ans :- Subtract 35 from 180 = 180 - 35 = 145

x = 135

Let n be any positive integer and b = 3n = 3q+rwhere q is the quotient and r is the remainder0<r<3so the remainders may be 0,1 and 2so n may be in the form of 3q, 3q=1, 3q+2

CASE-1If n=3qn+4=3q+4n+2=3q+2here n is only divisible by 3

CASE 2If n=3q+1n+4=3q+5n+2=3q=3here only n+2 is divisible by 3

CASE 3If n=3q+2n+2=3q+4n+4=3q+2+4=3q+6here only n+4 is divisible by 3

Hence it is justified that one and only one among n, n+2, n+4 is divisible by 3 in each case.

as we know that parralelogram has both lengths same and breadth are also same so they are equal i am not sure about answer

+1​​√​3−1​​​​​+​√​3​​​−1​​√​3​​​+1​​=a+√​3​​​b

Solving for a. Want tosolve for binstead?

1

Simplify3-13−1to22.

\frac{\sqrt{2}}{\sqrt{3}+1}+\frac{\sqrt{3}+1}{\sqrt{3}-1}=a+\sqrt{3}b​√​3​​​+1​​√​2​​​​​+​√​3​​​−1​​√​3​​​+1​​=a+√​3​​​b

2

Subtract\sqrt{3}b√​3​​​bfrom both sides.

\frac{\sqrt{2}}{\sqrt{3}+1}+\frac{\sqrt{3}+1}{\sqrt{3}-1}-\sqrt{3}b=a​√​3​​​+1​​√​2​​​​​+​√​3​​​−1​​√​3​​​+1​​−√​3​​​b=a

3

Switch sides.

a=\frac{\sqrt{2}}{\sqrt{3}+1}+\frac{\sqrt{3}+1}{\sqrt{3}-1}-\sqrt{3}ba=​√​3​​​+1​​√​2​​​​​+​√​3​​​−1​​√​3​​​+1​​−√​3​​​b

Done



Given cosec theta - sin theta = m, sec theta - cos theta = nGiven that cosec theta - sin theta = m→ !/sin theta - sin theta = m⇒(1-sin² theta)/sin theta = m→ cos² theta/sin theta = mand sec theta - cos theta = n⇒1/costheta - cos theta =n→ (1-cos² theta)/cos theta = nsin² theta/cos theta = nNow (m²n)²/³ + (mn²)²/³⇒(cos⁴ theta/sin² theta × sin² theta/cos theta)²/³ + (cos² theta/sin theta× sin⁴ theta/cos² theta)²/³⇒ (cos³ theta)²/³ + (sin³ theta)²/³⇒cos² theta + sin² theta= 1 Hence proved

a^m/a^n = a^m × 1/a^n = a^m × a^-n = a^(m-n)

LHS =sin40-cos70

=sin40-cos(90-20)

=sin40-sin20

now use formulasinA-sinB=2cos(A+B)/2.sin(A-B)/2

hence.sin40-sin20=2cos30.sin10

=2 x √3/2 x cos80

=√3cos80° =RHS

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In ΔABD and ΔCEFAB = AC (Given)

∠ABC = ∠ACB (Equal sides have equal opposite angles)

⇒ ∠ABD = ∠ECF∠ADB = ∠EFC (Each 90°)So, ΔABD ~ ΔECF (AA - Similarity)

11m-6m = 8n+5n

5m = 13n

2m = 26n/5

2m+5n/2m-5n =( 26n/5 + 5n)/( 26n/5 - 5n)

= 26n+25n/26n-25n

= 51n/n

= 51

0 is answer of this question

using the identity loga to the base b = loga/logb we get

= 1/(1+loga/logb +logc/logb) + 1/(1+loga/logc+logb/logc) +1/(1+logb/loga +logc/loga)

= logb/(loga+logb+logc) + logc/(loga+logb+logc) +loga/(loga+logb+logc)

= (loga+logb+logc)/(loga+logb+logc) = 1.

5:1 is right answer of this question.

angle= 180 —42 = 138

36 is the correct answer of the given question

(-3) ×(-6) × (-2) ×(-1) = 36 is correct answer

36 is the right answer

36 is the right answer

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a = 10 , d=-3 a30=a+29d =10-87 =-77

6.772727272727728373727737372737737373733u3u3

Lets the first term be a and common difference be da=1/3 d= 5/3-1/3 =4/3

Given for an APFirst term a = 5, Last term an = 45, Sum = 400

Let common difference is d and number of terms is n

Sum of n terms400 = n/2(a + l)400 = n/2(5 + 45)n = 800/50 = 16

an = a + (n-1)d45 = 5 + 15dd = 40/15 = 8/3