Hello! Today I am sharing two cards created with products from the just-launched Fluted Classics Collection by Becca Feeken at Spellbinders. My cards use the Circles and Squares sets. There are ovals, slimlines, and rectangles in the collection as well. While I created holiday cards, these designs are timeless and can be used for any number of occasions.
On the first card, I used the Circles and Squares as frames. The sets contain the fluted detail and outline dies for flexibility in how they are used.
- I glimmer-foiled the Mini Christmas Sentiment Strips sentiment in Silver on Brushed Gold cardstock.
- I cut the circle frame with a die in the Circles set from Brushed Silver and the Squares from Snowdrift cardstock.
- I die-cut a snowbank from Snowdrift cardstock, to which I applied Sparkle Dust Glitter, using the Color Block Scenic Scape die.
- I die-cut the Chill Bear as the focal point from a variety of cardstocks including cardstock on which I heat-embossed Red Tinsel embossing powder (for the scarf).
- I embellished the card with snowflakes cut from Snowdrift cardstock, to which I applied Sparkle Dust Glitter, using dies in the Chill Bear and Holiday Decorations sets.
On the second card, I used the Squares as a frame and as a border to a die in the All Is Calm Word Frame set.
- I cut the outside square frame with a die in the Squares set from Snowdrift cardstock. I cut the center piece by using a die in the Squares set with a die in the All Is Calm Word Frame set.
- I backed the interior piece with a square cut from Snowdrift cardstock to which I applied Sparkle Dust Glitter.
- I die-cut the All Is Calm Word Frame sentiment from Snowdrift cardstock on which I heat-embossed Gold Tinsel powder.
- I embellished the card with snowflakes cut from Snowdrift cardstock, to which I applied Sparkle Dust Glitter, using dies in the Silent Night and Holiday Decorations sets.
Beautifully Done Jean. Great dies and your cards are showing them off to perfection.
I love the double frames. That Let It Snow card is just stunning. You prove it does not need to be complicated!