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cos 48 = sin(90-48) = sin 42. sin 48 = cos (90-48) = cos 42Therefore, sin42 cos 48 + sin 48 cos 42 = (sin42)^2 + (cos42)^2= 1.

cos(90-A)=cos90cosA+sin90sinA=0+sinA=sinA

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length of ladder is l=5mwhen distance(x )of ladder from wall is 4m its height(h) on wall=(l^2 -x^2)^0.5h=(25-16)^2=3mgiven dx/dt =-2cm/s=-0.02m/snow;h^2 =l^2 -x^2differentiating w.r.t. to time t2h dh/dt =0-2x dx/dtputting values 2×3 dh/dt = -2×4×(-0.02)6 dh/dt = 0.16dh/dt =0.08/3 cm/s=8/3 m/s

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length of ladder,l=5mdx/dt=-2cm/s=-0.02cm/s... (x is distance of ladder from ground)-ve sign is used because height is decreasingheight, h^2 =l^2 - x^2...... (1)from here we get h=(5^2 - 4^2)^0.5=3mdifferentiating eq. (1)2h dh/dt =0-2x dx/dt .... (length of ladder is constant so its differentiation is 0)2h dh/dt = -2x dx/dtputting values2×3 dh/dt = -2×4×(-0. 02)dh/dt=0.08/3 cm/s=8/3 m/s

(x+1) (x+1) Hey please like my answer 🙏 and select the best 😃

x³+x²+x+1=x²(x+1)+1(x+1)=(x²+1)(x+1)

Given that length of theopen iron tank = 20 m.

Breadth of the closed iron tank = 10 m

The height of the closed iron tank = 8 m.

Surface Area of the tank = 2[ bh + hl]= 2[10×8+8×20]= 2×240=480m^2

Area of the rectangular iron sheet = 480m^2so that length × breadth = 480m^2

But breadth of sheet = 4 m (given)

∴ length = 480 / 4 = 120 m .

Given that cost of iron, the sheet used at the rate of Rs 5 per metre.The total cost of the sheet = Rs. (120 × 5) = Rs. 600.

(x+1) x(x+1)is the best answer

4/15÷16 4/15×1/16=1/60

1/60 is the correct answer

60 is right answer for question

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the. correct answer is. 48/49

48/49 is right answer of this question. please like my answer.

48/49 is the answer of the question

(12/7)÷(7/4)(12/7)×(4/7)48/49is correct answer

48/49 is the right to

48/49 is the answer....

48/49 is the right answer

48/49 is the correct answer of the given question

48/49 is the right answer

48/49 is the correct answer

(12/7) ÷ (7/4)(12/7) ÷ (4/7)48/49 is the correct answer

x^2 + 5x - (a^2 + a - 6) = 0

x^2 + 5x - (a^2 + 3a - 2a - 6) = 0

x^2 + 5x - [a(a + 3) - 2(a + 3)] = 0

x^2 + 5x + (a + 3)(a - 2) = 0

x^2 + (a+3)x - (a-2)x + (a+3)(a-2) = 0

x(x + a + 3) - (a - 2)(x + a + 3) = 0

(x - a + 2)(x + a + 3) = 0

x = (a - 2), - (a + 3)

Sorry I can't di these

Applying Pythagors' theorem,slant height, l² = r² +h²⇒ l² = 3² +4²⇒l² =25⇒slant height = 5mnow, curved surface area =π× r×l = 3.14×3×5 = 47.1 m²now, 10% extra material is required for stitching and wastage = 0.1×47.1=4.71 m²total area = 47.1 +4.71 =51.81 m²now, L×B = 51.81⇒Length ,L = 51.81/4.5 = 11.51 m

Given that length of theclosed iron tank = 12 m.

Breadth of the closed iron tank = 9 m

The height of the closed iron tank = 4 m.

Total Surface Area of the tank = 2[lb + bh + hl] = 2[12×9+9×4+4×12] = 384

Area of the rectangular iron sheet = 384So that length × breadth = 384

But the breadth of sheet = 2 m (given)

∴ length = 384 / 2 = 192 m .

Given that cost of iron, the sheet used at the rate of Rs 5 per metre.

The total cost of the sheet = Rs. (192 × 5) = Rs. 960.

(x*x*x-19x+30)/(x*x-3x-40) = (x*x*x-2x*x+2x*x-4x-15x+30)/(x*x-8x+5x-40) = ((x-2)(x*x+2x-15))/((x-8)(x+5)) = ((x-2)(x+5)(x-3))/((x-8)(x+5)) = ((x-2)(x-3))/(x-8)

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the answer is that 20 varg cm

x^2 + y^2=9; c1=0(0,0), r1=3; x^2+y^2-16x+2y+49=0=( x-8)^2+(y+1)^2= c2=(8, -1), r2=4; c1c2=V65> r1+r2; p=(-8a, a), q=(8b, -b), b>0, c1=c1c2x r2/r1=V65x3/(4-3)=3V65=a=3, p(-24, 3); pp1 perpencular p1c1=(y1-3)/( x1+24)×y1/ x1=-1=x1^2+ y^2+24x1-3y1=0; 8x1-y11+3 (or)y1=8×1+3=65x1^2+48x1=0, p1=(0,3) p2=(-48/65, -189/65), t1:y=3, t2=16x+63y=195

A = { x : x² - 4x - 5 = 0 }

x² - 4x - 5 = 0

x² + x - 5x - 5 = 0

x ( x + 1) -5 ( x +1) = 0

(x+1) ( x - 5) = 0

So in roaster form

A = { -1, 5}

⇒x2+5x−(a+3)(a−2)=0

⇒x2+[(a+3)−(a−2)]x−(a+3)(a−2)=0

⇒x2+(a+3)x−(a−2)x−(a+3)(a−2)=0

⇒x[x+(a+3)]−(a−2)[x+(a+3)]=0

⇒[x+(a+3)][x−(a−2)]=0

⇒[x+(a+3)]=0 or [x−(a−2)]=0

⇒x=−(a+3) or x=(a−2)