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4900 ko hum 70 × 70 lekh sakte hai to

√(4900) = 70 hoga.

b) option sahi hai

sum of angles around the point should be 360°

=> m(arc DE) +70 + 200° = 360°=> m(arc DE ) = 360-200°-70°=> m(arc DE) = 90°

so m(arc DEF) = 90°+70° = 160°

1

The quadrilateral CDHE is required to be proved to be a cyclic quadrilateral. CDH+CEH=180=DCE+EHD.

Join CB and AD, and join AH and BE.

From this construction we get two pairs of similar triangles: APD and BPC, and APH and BPE, because of the common angle at P, and equal angles PCB=DAP, PAH=BEP (angles in the same segment).

We can therefore write:

PD/PB=PA/PC=DA/BC (triangles PCB and DAP) and PB/PH=PE/PA=BE/HA (triangles PAH and BEP).

From this we get: PB.PA=PC.PD=PE.PH.

So PC.PD=PE.PH PC/PE=PH/PD.

Therefore, triangles PCE and PHD are also similar because P is theincluded common angle.

PDH=PEC. But CDH=180-PDH (supplementary angles on a straight line), so CDH=180-PEC (PEC is the same angle as CEH).

These are opposite angles of the quadrilateral CDHE, and this is a definitive property of cyclic quadrilaterals, so CDHE is cyclic.

The other two angles must also be supplementary because the angles of a quadrilateral add up to 360 degrees.

given by:- 》∠ECF = 70°,》m(arc DGF) = 200°》m(arc DE) = 360°-[m(arc DGF) + ∠ECF]》= > 360° - (200+70)》=> 360 - 270》m(arc DE) =90° ans》m(arc DEF) = m(arc DE) + ∠ECF》=> 90+70》m(arc DEF) = 160°ans》hence,》m(arc DEF) = 160°》m(arc DE) =90°

We may write y-√3x+3=0 as

y-0/√3/2=x-√3/1/2=r....(1)

Substituting x = √3+r/2, y=√3r/2 in y^2=x+2,

we get 3r^2/4=r/2+√3+23r^2-2r-(4√3+8)

=0AP.AQ=|r1.r2|=(4√3+8)/3=4(√3+2)/3.

(1 + x + y^-1)-1+(1 + y + z-1)-1+ (1 + z + x-1)-1= (1 + x + 1/y)-1+(1 + y + 1/z)-1+ (1 + z + 1/x)-1= (1 + x + xz)-1+(1 + y + 1/z)-1+ (1 + z + 1/x)-1[xyz = 1, or xz = 1/y]= (1 + x + xz)-1+{(z + yz + 1)/z}-1+ {(x + xz + 1)/x}-1= (1 + x + xz)-1+{(z + 1/x + 1)/z}-1+ {(x + xz + 1)/x}-1[xyz = 1, or yz = 1/x]= (1 + x + xz)-1+{(xz + 1 + x)/xz}-1+ {(x + xz + 1)/x}-1= 1 / (1 + x + xz) + xz / (1 + x + xz) + x / (x + xz + 1)= (1 + xz + x) / (1 + x + xz)= 1

Total outcomes = 6Favourable outcome = 3Probability of getting a composite number = 3/6 = 1/2

thank you

Let the coordinates of foot of perprndicular be (x1,y1)

Differentiating the equation to find the slope of the normal,

=> dy/dx = 8/(y-4)

slope = -(dx/dy)

hence we can find the equation of normal in terms of x1 and y1.

then passing through the (x1,y1)

thus we find a cubic equation on solving which we get,

y1= 0, 16 , -4

thus corresponding x1 = 0, 8 , 3

sorry the photo is clicked by mistake

80/50 80/49 80/48 this is a great answer

-8/5, -7/5, -6/5, -5/5, -4/5........8/5

6 subtracted 6 times from 27 = 27-(6*6) = 27-36 = -9

We know x³ + y³ + z³ - 3xyz= (x+y+z) (x²+y²+z²-xy-yz-zx)Given x + y + z = 0So,x³ + y³ + z³ - 3xyz = 0x³ + y³ + z³ = 3xyz

thank you

what is your question

option (1) that is (2, 0) is correct answer Mark as best

option 1 is the correct answer of the given question

Slope of the line formed by joining (3,4) and (-4,5) is (5-4)/(-4-3) =1/(-7)=-1/7So, slope of the perpendicular will be 7Let the equation be y=mx+bput m=7y=7x+bIt passes through (2,-3)-3=7(2)+b-3-14=bb=-17So, equation is y=7x-17

please post figure 6.41

cot (90-54) = tan 36tan(90-20)= cot70so tan 36/tan36+tan20/cot20-22-2=0

a) first quandrantbecause x=3 y=6 both are positive

a) first quandrant because x and y are both positive

a.)First quadrant because (x=3)and(y=6)are both positive

(a). First quadrant because (x=3) and (y=6) are both positive

Option (A)In first quadrants does the points P(3,6) lie.

The y coordinates are negative in 3rd and 4th quadrants.

thank you😊

y co-ordinates are negative in 2 nd and 3 rd quadrants

Theordinateis the y-coordinate of a pointon the coordinate plane.

2.5 dm

using BODMAS= (108 -- 78 ) / ( 5 × 2)= 30 / 10= 3

(27×4-13×6)/(25÷5×2)=(108-78)/(5×2)=30/10=3.....(Ans)

using BODMAS = (108 - 78) / 10= 30/10= 3

answer of this question is 3

(108 - 78) / (5×2)30 /103 answer

(27*4-13*6)/25÷5*2(108-78)/25÷1030/2.5=12 ans

3 is right answer of this question

=(108- 78) /(5X2)=30/10=3

यहाँ BODMAS का नियम लगाने पर -108-78/5*2=30/10=3 is answering

30_10 answer correct

30/10 =3 is answer cheak my answer

108_78/10=30/10=3 iska answ 3 hoga

Good question and I like this question

3 is a right ans for your question

using BODMAS= ( 27×4-13×6) / (5×2)= (108 - 78 ) /10= 30/10= 3 (Ans.)

3 is the correct answer

27*4-13*6=18250/10=3

answer=(27×4)-(13×5) /5×2=108-78 / 5×2=30/10=3 answer

correct answer of this question is 3

(27×4-13×6)/(25÷5×2 ) =(108-78) /(5×2) =30/10=3 (answer)

27×4-13×6/25÷5×2 108-87/25÷10

21/5/242/5

108-78 / 5x2 =30/10=3BODMOS formula

108-78/25÷10108-78/2.530/2.512

(27×4-13×6) /(25÷5×2)

=(108-78)/(5×2)= 30/10=. 3

=(108-78)/5×2=30/10=3

3 is the right answer of this question

4 is the right answer

3 is the right answer

tan(π/20) tan(3π/20) tan(5π/20) tan(7π/20) tan(9π/20) = 1.

To this end:tan(π/20) tan(3π/20) tan(5π/20) tan(7π/20) tan(9π/20)= tan(π/20) tan(3π/20) tan(5π/20) cot(π/2 - 7π/20) cot(π/2 - 9π/20)via cofunction identity

= tan(π/20) tan(3π/20) tan(5π/20) cot(3π/20) cot(π/20)= tan(π/20) tan(3π/20) tan(5π/20) * 1/tan(3π/20) * 1/tan(π/20)= tan(5π/20)= tan(π/4)= 1.

B is ans Please mark best 👈🙏

b is the correct answer of this question

b) is the right answer of the following

B is the correct answer

thnx for sending me this answer

wrong

45 percentage = 1351percentage = 135/45°1percent = 3°100 percentage होगा 3*100=300

जब 80 परसेंट =7201 परसेंट=720/809105 परसेंट=105*9=945 rupee

area=πr^2hencer=√10/πcmhence2r=2√10/πcmArea=πr^2=π*4*10/π=40cm^2

-7/9 - 4/9 = (-)11/98/3 - (-)11/6 = 27/6

-11/9 &. 27/6 is correct answer

-11/927/6. is the right answer

2y+5/3= 26/3 -y2y+y=26/3-5/33y=21/3=7y=7/3

thnx

ABC And ∆ADC Both Lie On The Same Base In A Way That

ar( ∆ABC ) = ar( ∆ABD)

to prove:-∆ABC And ∆ADB Lie Between The Same Parallel.. ie:- CD || AB

construction:-

Altitude CE And DF Of ∆ACB & ∆ADB.. On AB .Now According To Question It's Said That ∆ABC And ∆ABD Both lie On The Same Base ... And Both Have

Equal Area.

Now By Construction We Have ...

CE Perpendicular To AB

And DF Perpendicular To AB

Now We Know That Lines Perpendicular To Same Line Are Parallel To Each Other Therefore ...

CE || DF --- EQ (1)

So Now It's Given That

ar ( ABC ) = ar ( ABD )

Now We Know That ..

Area of triangle=1/2*base*area

Therefore

ar(ABC) = 1/2 × AB × CE

And

ar(ABD) = 1/2 × AB × DF

Now Since Area Of ABC = Area OF ABD

Therefore We Have ...

CE=DF ---- EQ. (2)

Now In Quadrilateral CDEF

CE = DF

And

CE || DF

So We Know That If In A Quadrilateral If One Pair Of Opposite Sides Are Equal And Parallel Then The

Quadrilateral Is Parallelogram.

Therefore

CDEF Is A Parallelogram ...

Therefore

CD || EF ( opposite Sides Of Parallelogram )

That Is ..

CD||ABHence proved