A bag contains Rs 750 in the form of rupee- 50 p- and 25 p coins in the ratio 5 - 9 - 4 amounting to Rs 206- Find the number of coins of each type-

Question

Toppr Admin · Accepted Answer

Let the number of 50 p - 25 p and 10 p coins be 5x- 9x and 4x respectivelyThen- 5x2-9x4-4x10-206-x21D2-50x-45x-8x-4120-x21D2-103x-4120-x21D2-x-40-x2234- Number of 50 p coins -5-xD7-40-200-xA0- -xA0-xA0-Number of 25 p coins -9-xD7-40-360-xA0- -xA0-xA0-Number of 10 p coins -4-xD7-40-160

A bag contains Rs 750 in the form of rupee, 50 p, and 25 p coins in the ratio 5:9:4 amounting to Rs 206. Find the number of coins of each type.

Let the number of 50 p , 25 p and 10 p coins be 5x, 9x and 4x respectivelyThen, 5x2+9x4+4x10=206⇒50x+45x+8x=4120⇒103x=4120⇒x=40∴ Number of 50 p coins =(5×40)=200 Number of 25 p coins =(9×40)=360 Number of 10 p coins =(4×40)=160

A bag contains $R s 750$ in the form of rupee, $50 p$ , and $25 p$ coins in the ratio $5 : 9 : 4$ amounting to $R s 206$ . Find the number of coins of each type.