Let's go through the questions one by one from the image.

1. Problem 1: Grant's coins are displayed, and the task is to count their total value.

   • The coins shown are as follows (from left to right):
     • Dime (10¢)
     • Another dime (10¢)
     • Quarter (25¢)
     • Nickel (5¢)
     • Nickel (5¢)
     • Penny (1¢)
     • Penny (1¢)
     • Penny (1¢)
   • If we add these values, we get: $10 + 10 + 25 + 5 + 5 + 1 + 1 + 1 = 58 \text{¢}$
   • Therefore, the total value of Grant's coins is 58¢.

2. Problem 2: We are asked to fill in the boxes with the values of the coins:

   • Dimes (two of them): $10 + 10 = 20$
   • Nickels and pennies combined: $5 + 5 + 1 + 1 + 1 = 15$
   • The total amount (adding all): $20 + 25 + 15 = 58$
   • So, the answer is 58¢.

3. Problem 3: This question simply asks for the total amount of Grant’s coins again.

   • Grant has 58¢.

Would you like a detailed breakdown of how to identify each coin type or any additional help with similar problems?

Here are 5 related questions you could explore:

1. How do you determine the value of a group of nickels, dimes, and pennies quickly?
2. What strategies can help when adding mixed coins?
3. If Grant had one more quarter, how much would his total be?
4. Why is it useful to group coins by type before adding?
5. How can you use mental math techniques to add these coin values efficiently?

Tip: When adding coin values, group similar coins together first to make addition easier (like adding all dimes, then nickels, and so on).