If 169 =`b^(2)+25` then find the value of b .The following sentences are the steps involved in solving the above problem .Arrange them in sequential order from the first to the last

In the adjacent figure ( not to scale), O is the centre of the circle and /_OBA =30^(@) . Find /_ ACB . The following sentences ae the steps involved in solving the above problem. Arrange them in sequential order from the first to the last. (A) /_OAB =30^(@), /_ OBA =30^(@) implies /_ AOB =180^(@) -30^(@)-30^(@) =120^(@) (B) We known that /_ ACD =("Reflex "/_AOB)/(2)=(240^(@))/(2)=120^(@) (C ) Reflex /_ AOB =240^(@) (D ) OA =OB (radii) implies /_ OBA= /_ OAB =30^(@) .

The angles of a triangle are in the ratio 2:3:4 . Find them The following are the steps involved in solving the above problem. Arrange them in sequential order from the first to the last. (A) 2x+3x+4x=180^(@) implies 9x= 180^(@)implies x=20^(@) (B) Let the angles be A,B and C. Given A:B:C=2:3:4 implies A=2x,B=3x=C=4x (C ) We know that the sumf of the angles of a triangle is 180^(@), ie., A+B+C=180^(@) (D) The angles are :A=2(20^(@))=40^(@),B=3(20^(@))= 60^(@) and C=4(20^(@))=80^(@) .

The following sentences are the steps involved in proving the result (cosx)/(1-tanx)+(sinx)/(1-cotx)=cosx+sinx . Arrange them in sequential order from first to last.

If the average mark of 15 students is 60 and the average mark of another 10 students is 70, then find the average mark of 25 students. The following are the steps involved in solving the above problem. Arrange them in sequential order. (A) Average marks of 25 students = (1600)/(25) = 64 (B) The total marks of 15 students = 15 xx 60 = 900 The total marks of 10 students = 10 xx 70 = 700 (C) The total marks of 25 students = 900 + 700 = 1600

The following are the steps invovled in solving .^(n)C_(2)=36 for n. Arrange then in sequential order.

Area of square plot is 6561 m^(2) find the length of a diagonal of the square plot . The following are the steps involved in solving the above problem Arrange them in sequential order (A) Area of the square plot = sqrt(2)xxx=81sqrt(2)m (B) Length of the diagonal = sqrt(2)xxx=81sqrt(2)m (C )Let the side of the square plot be x cm (D) therefore side of the square plot x= sqrt(6561) =81 m

The mean weight of a group of 9 students is 19 kg . If a body of weight 29 kg is joined in the group , then find the mean weight of 10 students. The following are the steps involved in solving the above problem . Arrange them in sequential order . (A) The mean weight of 10 students = (200)/(10) kg (B) The total weight of 9 students = 9 xx 19 kg = 171 kg (C) The total weight of 10 students = (171 + 29) kg = 200 kg (D) therefore The mean weight = 20 kg

Make l as the subject of the formula A=2(lb+bh+hl). The following steps are involved in solving the above problem Arrange them in sequential order.